Can someone show how to put theses 5 solutions ONLY in the complex form; .
Thanks
Can someone show how to put theses 5 solutions ONLY in the complex form; . Thanks...
Q2: Find the complex Fourier series (show your steps) - T < x <07 f(x) 0 < x < Q1: Find the Fourier transform for (show your steps) - 1<x< 0 Otherwise (хе f(x) = { 0,
can someone solve this question in good hand writing with explination of steps b) Solve the following problem using Laplace transformation: u = 104, +x.p?, 0<x< too, :>0, (0,1) = 1, u(x,0) = 0 Tim u(x,1)=0 *-* Xvx
can u please help me with both of these, thanks Let g(x) = x3 + x. Compute g(x+h)-g(x).( h Use the given information to compute sin Зп and π<θ < 2 cos 0 = 8
14. 4 -/1 points McKTrig8 6.2.037. Find all degree solutions in the interval 0° SO < 360°. If rounding is necessary, 10 cos + 13 tan 6 = sec Need Help? Read It Talk to a Tutor
Here are the question and answer of ordinary differential equation. Please show the steps. Thanks! 5. (a) Show that yo-Vi and y(t)-1/1 are solutions of the differential equa- tion (*) 21%y+3 ty' - y=0 on the interval 0<t<0. (6) Compute W[ 2](). What happens as i approaches zero? (c) Show that y(i) and yz(1) form a fundamental set of solutions of (*) on the interval 0<t<0. (d) Solve the initial-value problem 21%y" +3 ty'-y 0; y(1)-2, y'(l)-1. 5. (b) W=32;...
How many 'X's will be output? while (i <=3){ k=1: while (k <- i) { cout << "x"; cout << endl; ++i;)
both parts please mp/ Written Response #4 1) Algebraically determine all of the solutions of sin 2x = 0<x< 21. - , for the domain b) Write the general solution to part 1 2) Prove the following trig identity (show all work for credit) COS csc q + cota 1 + 2 cosq+ 9 cscq - cota (1 + cosq) (1 - cos q)
Can someone please help me in solving question in attached image. Thanks Suppose that an array A of n 1 numbers is given. We want to create a n x n matrix B such that, for 0 i<j<n, Bli.j] AIk] = Ali]Ali+1] for n ij 0, B[i.j] 0 +Aljl k-i I need to write a program where it accepts A as array and return B as matrix defined above, for O(n 2) algorithm
3i)16 in polar form: z r(cos 0isin 0) where (1 Write the complex number z and e= The angle should satisfy 0 0 < 2«.
5. Suppose that the probability distribution function (p.d.f.) of a random variable X is as follows: a-x3) for 0<x<1 o/w Sketch this p.d.f. and determine the values of the following probabilities: f(x) =