How can you multiply radicals with different index?

If you have two radicals with different index, for example, the square root of 9 and the cube root of 3, you can multiply them using the following method: take the cube root of each radical and multiply them together. The result will be the cube root of the product.

How to write complex equation with radicals?

If you are working with radical expressions with more than two radicals and do not know how to solve them, you can use an online calculator. However, make sure that you write the numbers in the correct denominator. The calculator will automatically convert the radical expressions to fraction forms.

How to multiply radicals with a different index?

If you’re trying to find a product with radical notation, you’ll find it easier to multiply two different radicals with different index than to try to add them together. For example, the product 3√9 × 5√3 will be easier to solve than 3√(9+5) because the index of the radical is different.

How to solve equation with radicals and fraction?

You may be asked to solve a problem with radicals and a fraction. If it’s a quadratic equation, you can solve it by completing the square and then exponentiating the resulting equation. If it’s a cubic or higher power, you can use the binomial theorem to solve it.

How to solve a complex fraction with radicals?

If you start with a radical expression like or the first thing you need to do is to simplify it. You can do this by multiplying the radical by the conjugate of the denominator. In other words, you’ll multiply the radical by the number that you would get by reversing the signs of the terms in the denominator. If you do that, you’ll end up with a fraction rather than an expression with radicals. Then you can use the following rules to