24. Find the Wronskian for the following: e^x, x^2, sin(x)

Find sin(x/2), cos(x/2), and tan(x/2) from the given information. Sin(x) = 24/25, 0° < x <...

Find sin(x/2), cos(x/2), and tan(x/2) from the given information. Sin(x) = 24/25, 0° < x < 90°

1- For the following functions, find all critical numbers exactly. f(x) = x − 2 sin...

1- For the following functions, find all critical numbers exactly. f(x) = x − 2 sin x for −2π < x < 2π f(x) = e^−x −e^−3x for x > 0 f(x) = x^5 − 2x^3

Suppose that f(x) = x^2, g(x) = sin(x) and h(x) = e^x. Using the appropriate rules,...

Suppose that f(x) = x^2, g(x) = sin(x) and h(x) = e^x. Using the appropriate rules, find the derivatives of the following functions: A. 3f−2g B. fg C. fh D. f◦g E. g◦f

1a.) Find the linearization of the function f(x) = (sin x+1)^2 at a = 0. 1b.)...

1a.) Find the linearization of the function f(x) = (sin x+1)^2 at a = 0. 1b.) Differentiate the two functions below. f(x) = ln(e^x - sin x) ; g(x) = e^-x^2

1. The Wronskian of the function x(t) = sin^3 t and an unknown function y(t) is...

1. The Wronskian of the function x(t) = sin^3 t and an unknown function y(t) is W (t) = sin^3 t. Find the general form of y(t).

For map g:(x,y) --> ( e^x cos y, e^x sin y), find the image of g....

For map g:(x,y) --> ( e^x cos y, e^x sin y), find the image of g. Write a proof that this is the image of g. Then, prove that g is not bijective. make sure all of your proofs are complete.

Find the Laplace Transform of the following functions: 1. e^(-2t+1) 2. cos^2(2t) 3. sin^2(3t)

Find the Laplace Transform of the following functions: 1. e^(-2t+1) 2. cos^2(2t) 3. sin^2(3t)

following nonlinear system: x' = 2 sin y, y'= x^2 + 2y − 1 find all...

following nonlinear system: x' = 2 sin y, y'= x^2 + 2y − 1 find all singular points in the domain x, y ∈ [−1, 1],determine their types and stability. Find slopes of saddle separatrices. Use this to sketch the phase portrait in the domain x, y ∈ [−1, 1].

1. Let ?(?)=8(sin(?))? find f′(2). 2. Let ?(?)=3?sin−1(?) find f′(x) and f'(0.6).

1. Let ?(?)=8(sin(?))? find f′(2). 2. Let ?(?)=3?sin−1(?) find f′(x) and f'(0.6).

Solve by method of undetermined coefficients y'' + y' = 9 - e^(-x) + x^(2)sin(x)

Solve by method of undetermined coefficients y'' + y' = 9 - e^(-x) + x^(2)sin(x)