The general formula for integrating 2^(x) is ∫ 2^(x) dx = 2^(x)/ln(2) + C, where C is the constant of integration.
To solve the integral of 2^(x), you can use the power rule of integration, which states that ∫ x^n dx = x^(n+1)/(n+1) + C. Therefore, for 2^(x), n = 1 and the integral becomes 2^(x)/ln(2) + C.
Yes, the integral of 2^(x) can be evaluated using substitution. One possible substitution is u = 2^(x), which results in du = 2^(x)ln(2) dx. This substitution can simplify the integral to the form ∫ u du, which can be easily evaluated.
The integral of 2^(x) is divergent. As x approaches infinity, 2^(x) also approaches infinity, making the integral unbounded.
Yes, the integral of 2^(x) can be solved using integration by parts. One possible choice for u is 2^(x), which results in du = 2^(x)ln(2) dx. The remaining integral can then be evaluated using the power rule of integration.