suppose X~N ( =1 , =3). Find a number k such that P (X > k)...

Suppose X~N(μ=1.5,σ=9). Find a number k such that P(X>k)=0.54. Round you answer to 3 decimal places.

Suppose X~N(μ=1.5,σ=9). Find a number k such that P(X>k)=0.54. Round you answer to 3 decimal places.

suppose that X ~ Bin(n, p) a. show that E(X^k)=npE((Y+1)^(k-1)) where Y ~ Bin(n-1, p) b....

suppose that X ~ Bin(n, p) a. show that E(X^k)=npE((Y+1)^(k-1)) where Y ~ Bin(n-1, p) b. use part (a) to find E(x^2)

1. Suppose that p(x)=∞∑n=0 an x^n converges on (−1, 1], find the internal of convergence of...

1. Suppose that p(x)=∞∑n=0 an x^n converges on (−1, 1], find the internal of convergence of p(3x-6) . x= to x= 2. If f(x)=∞∑n=0 n+1/n+2 x^n and g(x)=∞∑n=0 (−1)^n n+1/n+2 x^n, find the power series of 1/2(f(x)−g(x)). ∞∑n=0 =

1) Suppose that p(x)=∞∑n=0 anx^n converges on (−1, 1], find the internal of convergence of p(8x−5)....

1) Suppose that p(x)=∞∑n=0 anx^n converges on (−1, 1], find the internal of convergence of p(8x−5). x= to x= 2)Given that 11−x=∞∑n=0xn11-x=∑n=0∞x^n with convergence in (−1, 1), find the power series for 1/9−x with center 3. ∞∑n=0 Identify its interval of convergence. The series is convergent from x= to x=

Let X Geom(p). For positive integers n, k define P(X = n + k | X...

Let X Geom(p). For positive integers n, k define P(X = n + k | X > n) = P(X = n + k) / P(X > n) : Show that P(X = n + k | X > n) = P(X = k) and then briefly argue, in words, why this is true for geometric random variables.

Show that p(n,k)=p(n-1,k-1)+p(n-k,k)

Show that p(n,k)=p(n-1,k-1)+p(n-k,k)

Let P0<tn-1<k=0.42 , and k>0 and n≥2 and n is an integer. Find the following: P-k<tn-1<k...

Let P0<tn-1<k=0.42 , and k>0 and n≥2 and n is an integer. Find the following: P-k<tn-1<k P-k<tn-1<0 Ptn-1<k

For what value of k, f(x)=k( n!/(n-x)!x! p^x q^n-x) NOTE-HERE ^ symbol indicates power of p...

For what value of k, f(x)=k( n!/(n-x)!x! p^x q^n-x) NOTE-HERE ^ symbol indicates power of p which is x.

Find P(X ≤ k) in each case. (Round your answers to three decimal places.) (a)     n...

Find P(X ≤ k) in each case. (Round your answers to three decimal places.) (a)     n = 20, p = 0.15, k = 2 (c)     n = 10, p = 0.6, k = 9

If X ~ Bin (n, p) and Y ~ Bin (n, 1 - p). Verify that...

If X ~ Bin (n, p) and Y ~ Bin (n, 1 - p). Verify that for any k = 1, 2,.... P (X = k) = P (Y = n - k)