Show that the equation f(x) = sin(x) - 2x = 0 has exactly one solution on...

Show that the equation x+sin(x/3)−8=0 has exactly one real root. Justify your answer.

Show that the equation x+sin(x/3)−8=0 has exactly one real root. Justify your answer.

Suppose you know that f′(x) = x sin(2x) − sin(2x). Find the x-coordinates of all local...

Suppose you know that f′(x) = x sin(2x) − sin(2x). Find the x-coordinates of all local maximums of f in the interval (0, 2π).

Show that f(x) = C1e4x + C2e-2x is a solution to the differential equation: y’’ –...

Show that f(x) = C1e4x + C2e-2x is a solution to the differential equation: y’’ – 2y’ – 8y = 0, for all constants C1 and C2. Then find values for C1 and C2 such that y(0) = 1 and y’(0) = 0.

show that the equation x^3 + e^x =0 has exactly one root

show that the equation x^3 + e^x =0 has exactly one root

Show that f(x)=x4+4x-2 has exactly one real root in the interval [0, ∞)

Show that f(x)=x4+4x-2 has exactly one real root in the interval [0, ∞)

Show the equation x+cos^2(x/5) = 5 has exactly one solution in R.

Show the equation x+cos^2(x/5) = 5 has exactly one solution in R.

Show that there is a solution to the equation e^x=3-2x in the interval(0,1)

Show that there is a solution to the equation e^x=3-2x in the interval(0,1)

Find the general solution to the following equation, tx' + 2x = sin(t)/t Show that your...

Find the general solution to the following equation, tx' + 2x = sin(t)/t Show that your solution is correct.

2. Let f(x) = sin(2x) and x0 = 0. (A) Calculate the Taylor approximation T3(x) (B)....

2. Let f(x) = sin(2x) and x0 = 0. (A) Calculate the Taylor approximation T3(x) (B). Use the Taylor theorem to show that |sin(2x) − T3(x)| ≤ (2/3)(x − x0)^(4). (C). Write a Matlab program to compute the errors for x = 1/2^(k) for k = 1, 2, 3, 4, 5, 6, and verify that |sin(2x) − T3(x)| = O(|x − x0|^(4)).

x’+2x=sin(t), x(0)=1 solve the first order differential equation.

x’+2x=sin(t), x(0)=1 solve the first order differential equation.