Infinite nested radicals can be solved by recognizing their Taylor series expansion; for example, the integral of an infinite nested radical with factorial denominators simplifies to x^(e-2), which integrates to x^(e-1)/(e-1) + C using the power rule.
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How to solve an infinite radical integral using the Taylor expansion trick.Added:
This integral of an infinite nested radical looks like a total nightmare.
Most people would skip this instantly, but the solution is actually incredibly elegant.
First, we simplify.
Convert those roots into fractional exponents.
Notice a pattern in the denominators?
They are all factorials.
This is actually the Taylor series for e raised to the power of z, where z equals 1, but we are missing the first two terms. That means our entire integrand collapses down to x raised to the power of e minus 2.
Now the calculus is trivial. Just use the basic power rule. Add one to the exponent and divide by the result. We get x to the e minus 1 over e minus 1 plus our constant c. Nested infinity solved in under a minute.
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