Radical Simplifier & Rationalizer (with steps)

Q: What inputs are supported?

Educational scope with integers (n≥2, c>0, m>0). For even n, negative radicands are not real; in v1 they are treated as input errors.

Q: How is rationalization performed?

For monomials multiply by √[n]{c^{n-1}} to make the denominator c. For binomials use the conjugate (p−q√m), giving denominator p^2 − q^2 m. Reduce if needed.

Input

Mode

Teacher Notes

Factor out perfect n-th powers from the radicand; for monomials multiply by c^(n−1) under the root, and for binomials use conjugates. Show prime factorization and substitutions in the steps.

FAQ

What inputs are supported?

Integers with n≥2, c>0, m>0. Negative radicands with even n are not real; treated as input errors in v1.

How is rationalization performed?

Monomials: multiply by √[n]{c^{n−1}}. Binomials: multiply by the conjugate (p−q√m) for denominator p²−q²m. Reduce as needed.

Radical Simplifier & Rationalizer (with steps)

Input

Result

How it's calculated

Teacher Notes

FAQ

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Input

Result

How it's calculated

Teacher Notes

FAQ

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