my output is not simplified to one number

Question

Abdulaziz on 12 Apr 2012

1
Link

Direct link to this question

https://www.mathworks.com/matlabcentral/answers/35223-my-output-is-not-simplified-to-one-number

Edited: HIMANSHU GAUTAM on 17 Jun 2020

Accepted Answer: Walter Roberson

Open in MATLAB Online

Hi guys,

I need help with this issue please.

my output are not simplified at all. For example on of the outputs is

>> P(1)
ans =
(3931879*sin(exp(1) - 2))/4000000 - (1862469*sin(exp(2) - 2))/80000000 + (45497457*sin(exp(1/3) - 2))/40000000 - (18734247*sin(exp(2/3) - 2))/16000000 - (8607627*sin(exp(4/3) - 2))/16000000 + (6776217*sin(exp(5/3) - 2))/40000000 - (35386911*sin(1))/80000000

This all in on line i should has a one number instead of all this long expression

Best,

0 Comments
Show -2 older commentsHide -2 older comments

Sign in to comment.

Sign in to answer this question.

Answer 1

Walter Roberson on 12 Apr 2012

5
Link

Direct link to this answer

https://www.mathworks.com/matlabcentral/answers/35223-my-output-is-not-simplified-to-one-number#answer_44158

Open in MATLAB Online

vpa(P(1))

if you want to evaluate to a symbolic number with some number of decimal places.

double(P(1))

if you want to evaluate to a double precision floating point number.

1 Comment
Show -1 older commentsHide -1 older comments

Abdulaziz on 12 Apr 2012

Thank you Mr Walter your answers always the best

I appreciate your advice.

Sign in to comment.

Answer 2

Geoff on 12 Apr 2012

2
Link

Direct link to this answer

https://www.mathworks.com/matlabcentral/answers/35223-my-output-is-not-simplified-to-one-number#answer_44148

Open in MATLAB Online

Looks like you want:

A .* sin(exp(B) - 2) ./ C;

Where:

A = [3931879, -1862469, 45497457, -18734247, ...];
B = [1, 2, 1/3, 2/3, ...];
C = [4, 80, 40, 16, ...] * 1e6;

[edit]

Oh, I think you mean you want:

>> eval(P(1))
ans =
    -0.8428

2 Comments
Show NoneHide None

Abdulaziz on 12 Apr 2012

Tank you

Walter Roberson on 7 Jul 2019

You should never eval() a symbolic expression. Symbolic expressions are in a language that is not MATLAB.

Sign in to comment.

Answer 3

m sh on 20 Aug 2018

0
Link

Direct link to this answer

https://www.mathworks.com/matlabcentral/answers/35223-my-output-is-not-simplified-to-one-number#answer_333372

Thank you. It was helpful for me.

0 Comments
Show -2 older commentsHide -2 older comments

Sign in to comment.

Answer 4

muhammad kaleem on 13 Apr 2019

0
Link

Direct link to this answer

https://www.mathworks.com/matlabcentral/answers/35223-my-output-is-not-simplified-to-one-number#answer_370469

simplify 2+5-4+10^10+7^2

6

0 Comments
Show -2 older commentsHide -2 older comments

Sign in to comment.

Answer 5

Tomi Asli on 6 Jul 2019

0
Link

Direct link to this answer

https://www.mathworks.com/matlabcentral/answers/35223-my-output-is-not-simplified-to-one-number#answer_382224

Open in MATLAB Online

Hi,

I have a similar problem, however the accepted answer will not work:

solving for x at an intersection of a linear function with a 4th order polynomial function

>> syms a b c d e m t x 
>> eqn = t+m*x == a+b*x+c*x^2+d*x^3+e*x^4
>> fforx = solve(eqn, x, "MaxDegree", 4)

results in the expected output.

with the parameters for the variables

 t = -120.07208, m = -0.80227, a = 0.77755, b = 0.00161, c = 1.46526E-6, d = 7.15449E-8, e = 2.88799E-10

the second solution of fforx gives an expected value of -150.2553.

However the precedure to get this value is a two step procedure:

 >> fforx (2)
 
ans =
 
(3*6^(1/2)*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))*(3*3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2) + 2*(c/e - (3*d^2)/(8*e^2))^3 + 27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 72*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2) - 12*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))*((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/2) - 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3)*((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/2) - (c/e - (3*d^2)/(8*e^2))^2*((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/2) - 12*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3)*((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/2))^(1/2)/(6*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/6)*((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/4)) - d/(4*e) - ((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/2)/(6*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/6))
 
>> (3*6^(1/2)*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))*(3*3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2) + 2*(c/e - (3*d^2)/(8*e^2))^3 + 27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 72*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2) - 12*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))*((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/2) - 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3)*((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/2) - (c/e - (3*d^2)/(8*e^2))^2*((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/2) - 12*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3)*((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/2))^(1/2)/(6*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/6)*((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/4)) - d/(4*e) - ((c/e - (3*d^2)/(8*e^2))^2 + 9*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(2/3) - 6*(c/e - (3*d^2)/(8*e^2))*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/3) + (12*(a - t))/e - (9*d^4)/(64*e^4) - (3*d*(b - m))/e^2 + (3*c*d^2)/(4*e^3))^(1/2)/(6*((3^(1/2)*(27*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^4 + 128*(c/e - (3*d^2)/(8*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^2 - 256*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3))^3 + 4*(c/e - (3*d^2)/(8*e^2))^3*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2 - 16*(c/e - (3*d^2)/(8*e^2))^4*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)) - 144*(c/e - (3*d^2)/(8*e^2))*((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))^(1/2))/18 + (c/e - (3*d^2)/(8*e^2))^3/27 + ((b - m)/e + d^3/(8*e^3) - (c*d)/(2*e^2))^2/2 - (4*(c/e - (3*d^2)/(8*e^2))*((a - t)/e - (3*d^4)/(256*e^4) - (d*(b - m))/(4*e^2) + (c*d^2)/(16*e^3)))/3)^(1/6))
ans =
 -150.2553

how do I avoid this? Is there a way to directly compute the number? vpa and double will not work..

The output as a rather long expression in the first time prevents further calculations as I want to use the rather long partial derivations of these expression to make an error calculation. The long outputs then result in that the output exceeds the maximum line length for the command window display, which leads to an early end...

A direct computation of the values instead of the output of these expressions would help here I think...

2 Comments
Show NoneHide None

Walter Roberson on 7 Jul 2019

Use subs()

Tomi Asli on 8 Jul 2019

Thank you very much!

using subs() and vpa() together, no matter which one first, gave the solution!

Sign in to comment.

Answer 6

HIMANSHU GAUTAM on 16 Jun 2020

0
Link

Direct link to this answer

https://www.mathworks.com/matlabcentral/answers/35223-my-output-is-not-simplified-to-one-number#answer_451953

Open in MATLAB Online

I think this is quiet relevent thread to post my question. Although I have asked same question elsewhere. I am solving an integral equation but command window just prints the expression, rather it should print numerical result.

height = 2.5; % in units of meter.
a=5; % considering square room of area 20*20 meter^2.
area=4*a^2;
psi_FOV = 30*pi/180;
psi_half = 60*pi/180; 
m = -log10(2)/log10(cos(psi_half));
alpha = (m+1)*height^(m+1)/(2*pi);
K = alpha^2;
N = (1e-20)/K;
r_fov_anlytical = height*tan(psi_FOV);
d_fov_anlytical = height/cos(psi_FOV);
beta = (m+3);
height = 2.5;
% lambdaaxis=  .05:.01:1;
% avgSINR=zeros(1,length(lambdaaxis));
% for lambdaIdx=1:length(lambdaaxis)
    syms x y z;
   
     ons= (vpaintegral(vpaintegral(exp(-2.*pi.*.05.*vpaintegral((z - z.*exp ((-y.*N.*(sin( psi_FOV )).^4)./((x.^2+height^2 ).^(-beta))) ...
         .*exp ((-y.*( z.^2+ height.^2) .^( - beta))./(( x.^2+height.^2).^(-beta)))),z,x,r_fov_anlytical)) ...
         .*exp(- .05.*pi.*(x).^2).*(2.*pi).*.05.*x,y,0,inf),x,0,r_fov_anlytical))   
    
%      lambdaIdx

Command window output:

     
ons =
 
vpaintegral(vpaintegral((x*pi*exp(-(pi*vpaintegral(z - z*exp(-(y*(x^2 + 25/4)^4)/(z^2 + 25/4)^4)*exp(-(3358452346175993*y*(x^2 + 25/4)^4)/21267647932558653966460912964485513216), z, x, (5*3^(1/2))/6))/10)*exp(-(pi*x^2)/20))/10, y, 0, Inf), x, 0, (5*3^(1/2))/6)

I tried to use double,vpa, subs, but nothing worked.

3 Comments
Show 1 older commentHide 1 older comment

Walter Roberson on 16 Jun 2020

I noticed you deleted your Question. I had not responded there because I did not have any results for you as yet, but I was working on it.

HIMANSHU GAUTAM on 17 Jun 2020

Edited: HIMANSHU GAUTAM on 17 Jun 2020

Yes, I deleted it because someone commented that I shouln't post multiple question. Although I have asked new question covering all the aspect of that question. Thank you for the reply. It would help me if you can share your findings, here or at the new question, that I asked.

Sign in to comment.

my output is not simplified to one number

0 Comments
Show -2 older commentsHide -2 older comments

Accepted Answer

1 Comment
Show -1 older commentsHide -1 older comments

More Answers (5)

2 Comments
Show NoneHide None

0 Comments
Show -2 older commentsHide -2 older comments

0 Comments
Show -2 older commentsHide -2 older comments

2 Comments
Show NoneHide None

3 Comments
Show 1 older commentHide 1 older comment

See Also

Categories

Tags

Community Treasure Hunt

my output is not simplified to one number

0 Comments Show -2 older commentsHide -2 older comments

Accepted Answer

1 Comment Show -1 older commentsHide -1 older comments

More Answers (5)

2 Comments Show NoneHide None

0 Comments Show -2 older commentsHide -2 older comments

0 Comments Show -2 older commentsHide -2 older comments

2 Comments Show NoneHide None

3 Comments Show 1 older commentHide 1 older comment

See Also

Categories

Tags

Community Treasure Hunt

0 Comments
Show -2 older commentsHide -2 older comments

1 Comment
Show -1 older commentsHide -1 older comments

2 Comments
Show NoneHide None

0 Comments
Show -2 older commentsHide -2 older comments

0 Comments
Show -2 older commentsHide -2 older comments

2 Comments
Show NoneHide None

3 Comments
Show 1 older commentHide 1 older comment