An object attached to a coiled spring is pulled down a distance a from its rest position and then released. Assuming that the motion is simple harmonic with period T, write an equation that relates the displacement d of the object from its rest position after t seconds. Also assume that the positive direction of the motion is up.a = 18;T = 4? seconds

Solve the triangle, if possible. If the triangle represents the ambiguous case, solve for all possible triangles. Approximate values to the nearest tenth when appropriate.

A. ? = 60°, ? = 60°, c = 28.1 B. ? = 90°, ? = 60°, c = 28.1 C. ? = 60°, ? = 90°, c = 28.1 D. No solution

Solve the system by using Gaussian elimination with backward substitution or by reducing the matrix to reduced-row echelon form. x- y+ 4z= -13x+ z= 0 x+ 2y+ z= 2

A. (0, 1, 0) B. No solution C. (0, 0, 1) D. (0, 1, -1)

Find the function f given that the slope of the tangent line to the graph of f at any point  is  and that the graph of f passes through the given point.

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What will be an ideal response?

Use the quadratic formula to solve the given equation.x2 + x -  = 0

A. ± 
B.
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