We need at least 10 more requests to produce the answer.
0 / 10 have requested this problem solution
The more requests, the faster the answer.
Please write legible 6. Show that f(x) = Inc is decreasing for x > e.
5) The antiderivative F(x) for f(x) xcos2x with F(0) Please write legible
PLEASE WRITE THE ANSWER LEGIBLE! 30. Solve: r-6 X-4 + 16 = 0. Show work. r? -16
Exercise 6. Show that if f(x) > 0 for all x e [a, b] and f is integrable, then Sfdx > 0.
6-4 (a) The function g(x) is monotone increasing and y = g(x). Show that F(x) if xy(x, y) =İF,(y) if y>g(x) y<g(x) xytty (b) Find Fxy(x, y) if g(x) is monotone decreasing.
Please show work! (1 point) Find the Laplace transform F(s) of f(t) { O, t<6 5 sin(at), 6<t<7 0, t> 7 F(8)
6. Let X have exponential density f(x) = le-Az if x > 0, f(x) = 0 otherwise (>0). Compute the moment-generating function of X.
PLEASE WRITE LEGIBLE
6. Let f:Q+R be integrable over the n-rectangle Q, and suppose f(x) > 0 for all x € Q. Show that ſo f > 0. (Be careful: it is possible for m (f) = 0 for a subrectangle RCQ, even when f >0.)
(1) If f: R₃ R a continuous function such that f(x)² > 0 for all xER. Show that either f(x) >0 for all a ER or f(x) <0 all X E R.
please write legible and show all steps, im getting ready for finals and need to know how to work this problem. 1. f the number of car accidents occurring on a highway every day is a Poisson random variable with parameter 3,find the probability density function (pdf) of the random variable K.