We'll need to find the derivative of the given function with respect to x and then evaluate the result at the value pi/2.
y = 8x sin(x) is a product: y = [8x] * [sin x]. We must use the product rule for differentiation:
dy/dx = [8x][cos x] + [sin x][8]
Now substitute pi/2 in the above derivative. We get:
(slope of tangent line) = dy/dx = [8pi/2][cos pi/2] + [sin pi/2][8]
The slope of the tangent line is m = [8pi/2][0] + [1][8] = 8
Thus, the equation of the tangent line is y-4pi = 8[x-pi/2], or
2y-8pi = 8[2x-pi]
