the pictured problem has multiple parts and the F(x) =
(x/3) -1 for c<x<5
AND = (x/6) for 5<= x <= 6.
for parts c i got p(x=5) = 5/6 and for part d, I got p(x=5.5)= 5.5/6.
I need help on parts a, b, and e. however I think on part a that c=3 because probabilities of F(x) can only go from 0 to 1 and when c = 3, we get 3 but not sure exactly if that is correct. please help. here is the pictured problem with all parts a through e.
the pictured problem has multiple parts and the F(x) = (x/3) -1 for c<x<5 AND =...
Problem 2 (30 pts) This problem has six parts that may be worked independently. Let X(el") be the Fourier transform of the discrete-time signal x[n] show below. 3 ILL -7 -2 3 5 n a) Find X(e). (5 pts) b) Determine ZX(el), the phase of X(el). (5 pts) c) Evaluate ſ x(e)")do. (5 pts) d) Find X(el). (5 pts) e) Determine and sketch the signal whose Fourier transform is Re{X(ek)}. (5 pts) - f) Evaluate Í ax (e10 do. (5...
Problem 2 (30 pts) This problem has six parts that may be worked independently. Let X(e) be the Fourier transform of the discrete-time signal x[n] show below. x[n] -7 -5 -3 -2 2 -1 4 5 a) Find X(e). (5 pts) b) Determine ZX(el), the phase of X(e), (5 pts) c) Evaluate )do. (5 pts) Intel® d) Find X(el). (5 pts) e) Determine and sketch the signal whose Fourier transform is ReX(0)} (5 pts) f) Evaluate xo do. (5 pts)...
Problem 3. The random variable X has density function f given by 0, elsewhere (a) Assuming that 6 0.8, determine K (b) Find Fx(t), the c.d.f. of X (c) Calculate P(0.4 <X < 0.8)
Problem # 1: Let 3-1x< . f(x) 7x 0 x1 The Fourier series for f(x). (an cosx bsinx f(x) n1 is of the form f(x)Co (g1(n,x) + g2(n, x) ) n-1 (a) Find the value of co. (b) Find the function gi(n,x) (c) Find the function g(n, x) Problem #2 : Let f (x ) = 8-9x, - x< I Using the same notation as n Problem #1 above, (a) find the value of co- (b) find the function g1(n,x)....
which part b uses the answer from part a. 4. (35 pts) Let f(x) = x(1-x) for 0 < x < 1. (a) (15 pts) Compute the Fourier cosine series FCS f(x). (b) (5 pta) Find the formal solution of the problem BC u,(O, t)-u(1,t)-0, (c) (5 pts) Show that there can be no solution of problem (A) which is Ca for 0 S S 1 and (d) (10 pts) Show that there is a Co solution of the DE...
Problem 7. (10 pts) The graph of f'(x) is given below. If f(0) = 5, find f(x) at I = 2, 2 = 6, and I=10. y f'(x) 3 4 2 5 10 -1 2
Problem 1-5 1. If X has distribution function F, what is the distribution function of e*? 2. What is the density function of eX in terms of the densitv function of X? 3. For a nonnegative integer-valued random variable X show that 4. A heads or two consecutive tails occur. Find the expected number of flips. coin comes up heads with probability p. It is flipped until two consecutive 5. Suppose that PX- a p, P X b 1-p, a...
thanks for the help. not exactly how to even start this pictured problem thanks. 6. Let f(x,y)= e-(x+y) for 0 < x, 0 < y. Let U = X/(X + Y) and V = X+Y. Find f(u,v).
Previous Problem Problem List Next Problem f(x, y) (1 point) Consider the function f(x, y) = (e* - 5x) sin(y). Suppose S is the surface z (a) Find a vector which is perpendicular to the level curve of f through the point (5,4) in the direction in which f decreases most rapidly. vector -(eA5-5)sin(4)i+-(e^5-5(5)cos(4)j (b) Suppose above (5,4). What is a? 2i 8jak is a vector in 3-space which is tangent to the surface S at the point P lying...
e (10 pts.) Approximate the area between the curve f(x) and x 3, by the following methods: and the x-axis, between x 0 a. Using 6 rectangles (n 6), and the Midpoint Rule. b. Using 6 rectangles, and left endpoints. c. Using 6 rectangles, and right endpoints. d. Find the average of your answers for parts (b) and (c). e. Compute the percent error for you answers in parts (a) and (d), using the following: - exact answer I calculated...