∫ cot(x) dx = ln(sin(x)) + C
C is the constant of integration.
∫ coth(x) dx = ln(sinh(x))+ C C is the constant of integration.
The integral of X 4Y X 8Y 2 With respect to X is 2ln(10/9).
if you are integrating with respect to x, the indefinite integral of 1 is just x
The integral of the function 1 sinc(x) with respect to x is x - cos(x) C, where C is the constant of integration.
The cotangent function has domain all real numbers except integral multiples of pi./2(90degrees).
d/dx ∫ f(x) dx = f(x)
With respect to x, this integral is (-15/2) cos2x + C.
The indefinite integral of x dt is xt
This depends on what you are integrating with respect to. Let's assume: x. Integral of 9*pi = 9*pi*x + C. However, if you are integrating with respect to pi, then integral of 9*pi is (9/2)pi^2 + C
∫ d/dx f(x) dx = f(x) + C C is the constant of integration.
Cotangent 32 equals tangent 0.031
∫ sin(x) dx = -cos(x) + CC is the constant of integration.