Evaluate ∫cos2 xdx_________
Evaluate ∫cos2 xdx_________
-x/2+sin2x/4+c
x/2+sin2x/2+c
x/2+sin2x/4+c
-x/2+cos4x/4+c
The Correct Option is A
Solution and Explanation
To evaluate the integral ∫cos2xdx, we can use the trigonometric identity for cos2x, which is:
cos2x = (1 + cos2x) / 2
Substituting this identity into the integral, we have:
∫cos2xdx = ∫(1 + cos2x)/2 dx
We can split the integral into two separate parts:
= (1/2)∫dx + (1/2)∫cos2xdx
The first integral is straightforward:
(1/2)∫dx = x/2
The second integral requires substituting 2x with a new variable, u. Let:
u = 2x, then du = 2dx, or dx = du/2
Now substitute into the integral:
(1/2)∫cos2xdx = (1/2)∫cosudu/2 = (1/4)∫cosudu
The integral of cosu is sinu, so we have:
(1/4)∫cosudu = (1/4)sinu + C
Re-substitute back for u = 2x:
(1/4)sin2x + C
Combine the results from both integrals:
∫cos2xdx = x/2 + sin2x/4 + C
Therefore, the evaluated integral is:
-x/2 + sin2x/4 + c
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Concepts Used:
Integration by Parts
Integration by Parts is a mode of integrating 2 functions, when they multiplied with each other. For two functions ‘u’ and ‘v’, the formula is as follows:
∫u v dx = u∫v dx −∫u' (∫v dx) dx
- u is the first function u(x)
- v is the second function v(x)
- u' is the derivative of the function u(x)
The first function ‘u’ is used in the following order (ILATE):
- 'I' : Inverse Trigonometric Functions
- ‘L’ : Logarithmic Functions
- ‘A’ : Algebraic Functions
- ‘T’ : Trigonometric Functions
- ‘E’ : Exponential Functions
The rule as a diagram:
