∫(secx)dx
To solve the integral of sec(x) with respect to x, you can use a technique called integration by substitution
To solve the integral of sec(x) with respect to x, you can use a technique called integration by substitution. Here’s how you can do it:
Step 1: Begin by rewriting sec(x) as 1/cos(x).
∫(sec(x)) dx = ∫(1/cos(x)) dx
Step 2: Let u = cos(x). Differentiate both sides of this equation with respect to x to find du:
du/dx = -sin(x)
Step 3: Rearrange the equation to solve for dx:
dx = du / (-sin(x))
Step 4: Substitute the u and dx values from steps 2 and 3 into the integral:
∫(1/cos(x)) dx = ∫(1/u) (du / -sin(x))
Step 5: Rewrite the integral in terms of u:
∫(1/u) (du / -sin(x)) = -∫(1/u) (du / sin(x))
Step 6: Simplify the integral:
-∫(1/u) (du / sin(x)) = -∫(du / (u * sin(x)))
Step 7: Recognize that the new integral can be solved using a natural logarithm:
-∫(du / (u * sin(x))) = -ln|u| + C
Step 8: Substitute the value of u from step 2:
-∫(du / (u * sin(x))) = -ln|cos(x)| + C
So, the integral of sec(x) with respect to x is -ln|cos(x)| + C, where C is the constant of integration.
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