[size=150]Calculus integration involves various types of integrals, each with its own set of rules and techniques. Here are some common types of integrals with examples:[br][br]1. Power Rule:[br]The power rule is used to integrate functions of the form f(x) = x^n, where n is any real number except -1.[br][br] Example: ∫(3x^2) dx = x^3 + C[br][br]2. Constant Rule:[br]The constant rule states that the integral of a constant multiplied by a function is equal to the constant multiplied by the integral of the function.[br][br] Example: ∫(5sin(x)) dx = -5cos(x) + C[br][br]3. Trigonometric Integrals:[br]Trigonometric integrals involve integrating functions containing trigonometric functions.[br][br] Example: ∫(cos(x)) dx = sin(x) + C[br][br]4. Exponential and Logarithmic Integrals:[br]Exponential and logarithmic integrals involve functions containing exponential and logarithmic functions.[br][br] Example: ∫(e^x) dx = e^x + C[br][br]5. Integration by Substitution:[br]Substitution involves substituting a variable or expression with a new variable to simplify the integral.[br][br] Example: ∫(2x+1)^3 dx (Let u = 2x+1) = ∫u^3 (1/2) du = (1/2) * (u^4/4) + C = (1/8) * (2x+1)^4 + C[br][br]6. Integration by Parts:[br]Integration by parts is used to integrate the product of two functions.[br][br] Example: ∫x * sin(x) dx = -x * cos(x) + ∫cos(x) dx = -x * cos(x) + sin(x) + C[br][br]7. Trigonometric Substitution:[br]Trigonometric substitution is a technique used to simplify integrals involving radical expressions using trigonometric identities.[br][br] Example: ∫sqrt(1-x^2) dx (Let x = sin(u)) = ∫cos^2(u) du = ∫(1+cos(2u))/2 du = (u/2) + (sin(2u))/4 + C[br][br]8. Partial Fractions:[br]Partial fractions are used to decompose a rational function into simpler fractions to make integration easier.[br][br] Example: ∫(3x+1)/(x^2+2x+1) dx = ∫(3x+1)/(x+1)^2 dx = ∫(A/(x+1) + B/(x+1)^2) dx[br][br]These are just a few examples of the different types of integrals and techniques used in calculus integration. Each type requires specific strategies and methods to evaluate the integral, and the choice of technique depends on the form of the function being integrated.[/size]