No BSD License  

Highlights from
MATLAB for Engineers

• Zi =filteric(B,A,X,Y)
• acosd(alpha) ACOSD arc cos, in degrees, of the elements of alpha.
• ayrton(range, amp, resist) AYRTON calculates resistances for an Ayrton multirange ammeter.
• bending1(s, d, F1, F2) BENDING1 bending moments caused vehicle moving on beam.
• conic(phi, param) CONIC.M generates a conic section whose equation is given in polar form.
• dcmot(t,om); this function represents the model of a DC motor
• dervabk(t,x); this function returns the derivatives of the unit feedback system
• divide(x, y)
• eulangle(psi, theta, phi) EULANGLE matrix of rotations by Euler's angles.
• evalpol2(c, x) EVALPOL2 Polynomial evaluation by Horner's scheme.
• fact(x) FACT factorial by a recursive procedure.
• gcd1(x, y, tol)
• gcd2(x, y) GCD2 greatest common divisor by a recursive procedure.
• pend(t,w); This m-file describes the motion of a pendulum subject to gravity,
• pliny(t,h); This function respresents the model of the Pliny's intermittent fountain
• rndprm1(X); RNDPRM1 random permutation of row vector using FOR loop.
• rndprm2(X); RNDPRM2 random permutation of row vector using WHILE loop.
• rndprm3(X); RNDPRM3 random permutation of row vector using recursion.
• rtate(theta) RTATE(THETA) rotates theta degrees counterclockwise
• scale(alpha, beta) SCALE scaling matrix.
• segment(A,r) SEGMENT angle subtended by a circular segment.
• segment1(A,r) SEGMENT1 angle of circular segment, plot of iterations.
• simp(x, y) SIMP(X, Y) Simpson integration of tabular data y(x).
• sind(alpha)
• sind(alpha) COSD(ALPHA) cosine of the elements of ALPHA, angle measured in degrees.
• spipe(Re) LAMBDA smooth-pipe frictional coefficient.
• tankv(M, V0, tol) TANKV(M, V0, tol) tank volume by iterative method
• trlate(dx, dy)
• uramp(t, t0) URAMP(t, t0) unit ramp function beginning at t0.
• ustep(t, t0)
• vprod(A, B)
• wd =doga(t,w); This function represents the model of the dog chasing problem,
• wd =dogb(t,w); This function represents the model of the dog chasing problem,
• wd=derv2a(t,w); example of linear differential equation
• wd=derv2b(t,w); example of linear differential equation
• wd=derv3a(t,w); example of linear differential equation
• wd=derv3b(t,w); example of linear differential equation
• wd=invp(t,w); inverted pendulum on a cart.
• wd=spring(t,w); This function defines the differential equation relative to
• wd=stiff(t,w); This function defines the differential equation of a stiff system
• xd=cspring(t,x); This function defines the spring system. It is written in the format
• alias.m
• atmpres.m
• bolind1.m
• br1.m
• br2.m
• br3.m
• ch14ex10.m
• ch14ex12.m
• ch14ex2a.m
• ch14ex2b.m
• ch14ex3a.m
• ch14ex3b.m
• ch14ex4a.m
• ch14ex4b.m
• ch14ex7.m
• ch15ex11.m
• ch15ex14.m
• ch15ex16.m
• ch15ex3.m
• ch15ex5.m
• ch15ex7.m
• ch15ex8.m
• ch15ex9.m
• ch16ex10.m
• ch16ex12.m
• ch16ex2.m
• ch16ex3.m
• ch16ex7.m
• complext.m
• crane.m
• diode.m
• door.m
• evalpol.m
• evalpol1.m
• exa2_05.m
• exa3_05.m
• exa3_06.m
• exam04_1.m
• exam09_2.m
• exam09_3.m
• exe10_02.m
• exe10_06.m
• exe10_09.m
• exe11_12.m
• exe11_13.m
• exe17_04.m
• exer2_03.m
• exer2_04.m
• exer2_06.m
• exer2_09.m
• exer2_11.m
• exer3_03.m
• exer3_07.m
• exer3_10.m
• exer3_13.m
• exer3_14.m
• exer4_05.m
• exer4_06.m
• exer4_10.m
• exer5_07.m
• exer6_05.m
• exer6_06.m
• exer6_08.m
• exer7_03.m
• exer8_02.m
• exer8_05.m
• exer9_05.m
• exer9_11.m
• fig04_06.m
• fig04_09.m
• fig05_08.m
• fig06_01.m
• fig06_02.m
• fig10_03.m
• fig10_04.m
• fig10_12.m
• fig11_01.m
• fig11_02.m
• fig1_11.m
• fndwmal.m
• hello.m
• hi_lo.m
• itermenu.m
• kvisc.m
• newton.m
• ospring.m
• pipe.m
• raphson.m
• rectify.m
• rod1.m
• rod2.m
• s_couple.m
• scissor.m
• supsteam.m
• turbot.m
• ultim.m
• vecrot.m
• yellow.m
• yellow1.m
• View all files