inquisitive said:Anyone please help I need a detailed proof of this integral
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\int du/(u^2-a^2) = (1/2a) ln (u+a)/(u-a) + C
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An integral proof is a mathematical method for proving an equation or statement by using the concept of integrals. It involves breaking down the equation into smaller parts and analyzing their integrals to show that they are equal.
The expression u^2-a^2 is known as a difference of squares, which is a commonly used expression in integral proofs. It helps to simplify the equation and make it easier to integrate and prove.
The integral proof for u^2-a^2 involves using the formula for the integral of a difference of squares, which is (u^2-a^2) = [(u-a)(u+a)] and then using the properties of integrals to prove that it is equal to the original equation.
First, we rewrite the equation as (u^2-a^2) = [(u-a)(u+a)]. Then, we use the properties of integrals to split the integral into two parts, one for (u-a) and one for (u+a). Next, we integrate each part separately and combine them back together to get the final result of (u^2-a^2) = [(u-a)(u+a)]. This shows that the integral of the original equation is equal to the integral of the difference of squares.
The integral proof for u^2-a^2 is a fundamental method in calculus and is used in various real-life scenarios, such as calculating areas, volumes, and work done. It is also used in fields such as physics, engineering, and economics to solve complex problems and make accurate predictions.