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Solve the integral equation using the generalized power rule

Solve the integral equation using the generalized power rule-example-1
User Pindol
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Final answer:

The generalized power rule is used to solve integral equations. It states that if we have an integral in the form x^n dx, the result is (x^(n+1))/(n+1) + C, where C is the constant of integration. To solve the integral equation using the generalized power rule, apply the power rule to each term separately and sum up the results.

Step-by-step explanation:

The generalized power rule is used to solve integral equations.
The power rule states that if we have an integral in the form ∫xndx, where n is any real number except -1, the result is (xn+1) / (n+1) + C, where C is a constant of integration.

To solve the integral equation using the generalized power rule, evaluate the integral by applying the power rule. If the integral involves multiple terms, apply the power rule to each term separately and sum up the results.

Remember to include the constant of integration to account for any potential discrepancy in the solution.

User Galloper
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Answer:

a = 4x with a small 3 at the top ( x with a small 4 at the top + 3x ) with a small 30 + 3

b = B = 6x with a small 17 at the top + 192x with a small 15 at the top + 2520x with a small 13 at the top + 17280x with a small 11 at the top + 64800x with a small 9 at the top + 124416x with a small 7 at the top + 93312 with a small 5 at the top

sorry but I don't know c

Step-by-step explanation:

User Roy
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