Given that x = 1/2 is a root of 2x3 - 9x2 + kx - 13...

Given (k is a constant): x + y + kz = 1 kx + y +...

Given (k is a constant): x + y + kz = 1 kx + y + z = 3 2kx + 4y + 4z = 3k +12 Find the values of "k" for which the system has: 1. A unique solution. 2. Infinitely many solutions. 3. No solution. b. Plug k = −2 and find the solution for the system c. Plug k = 0 and find the solutions for the system. d. Find the solution for k = 0...

Consider a function f(x) = 2x3 − 11.7x2 + 17.7x − 5. Identify the root of...

Consider a function f(x) = 2x3 − 11.7x2 + 17.7x − 5. Identify the root of the given function after the third iteration using the secant method. Use initial guesses x–1 = 3 and x0 = 4. CAN YOU PLZ SHOW ALL THE WORK. THANK YOU

f(x)=kx/8, 0<x<5. Find the value of the constant k and Pr(1<x<3). *

f(x)=kx/8, 0<x<5. Find the value of the constant k and Pr(1<x<3). *

Consider the polynomial P(x)=−4x5+5x4−4x+5P(x)=−4x5+5x4−4x+5. (a) Verify that 12√(1+i)12(1+i) is a root of P(x)?(?). b) Given that...

Consider the polynomial P(x)=−4x5+5x4−4x+5P(x)=−4x5+5x4−4x+5. (a) Verify that 12√(1+i)12(1+i) is a root of P(x)?(?). b) Given that 12√(1+i)12(1+i) is also a root of P(−x)P(−x), without calculation list 44 distinct roots of P(x)P(x). Explain your answer. (c) Prove that P(x)P(x) has no real roots in (−∞,0](−∞,0] or in [3,∞)[3,∞).

Transform the given system into a single equation of second-order x′1 =−8x1+9x2 x′2 =−9x1−8x2. Then find...

Transform the given system into a single equation of second-order x′1 =−8x1+9x2 x′2 =−9x1−8x2. Then find x1 and x2 that also satisfy the initial conditions x1(0) =7 x2(0) =3. Enter the exact answers. Enclose arguments of functions in parentheses. For example, sin(2x).

The polynomial of degree 4, P(x) has a root of multiplicity 2 at x=2 and roots...

The polynomial of degree 4, P(x) has a root of multiplicity 2 at x=2 and roots of multiplicity 1 at x=0 and x=-4 It goes through the point (5,324). Find a formula for P(x)

1) find a cubic polynomial with only one root f(x)=ax^3+bx^2+cx +d such that it had a...

1) find a cubic polynomial with only one root f(x)=ax^3+bx^2+cx +d such that it had a two cycle using Newton’s method where N(0)=2 and N(2)=0 2) the function G(x)=x^2+k for k>0 must ha e a two cycle for Newton’s method (why)? Find the two cycle

Obtain the solution to the initial value problem kt + c(k)kx = 0, k(x,0) =(150 |x|...

Obtain the solution to the initial value problem kt + c(k)kx = 0, k(x,0) =(150 |x| > 1 =150(1 + (1−|x|)/5) |x|≤ 1

Given the cost function: C(x) = 1000 + 96x + 2x3/2 Please do the following: 1....

Given the cost function: C(x) = 1000 + 96x + 2x3/2 Please do the following: 1. Find the cost, average cost, and marginal cost at a production level of 1000 units 2. Find the production level that will minimize the average cost 3. Find the minimum average cost 3. Find the minimum average cost Please show your step by step calculation. Thank you.

Suppose that a random variable X has the distribution (pdf) f(x) =kx(1 -x^2) for 0 <...

Suppose that a random variable X has the distribution (pdf) f(x) =kx(1 -x^2) for 0 < x < 1 and zero elsewhere. a. Find k. b. Find P(X >0. 8) c. Find the mean of X. d. Find the standard deviation of X. 2. Assume that test scores for all students on a statistics test are normally distributed with mean 82 and standard deviation 7. a. Find the probability that a single student scores greater than 80. b. Find the...