what is that 4 doing there?
is 4√y supposed to mean 4th root of y?
x^(11/10) is 10th-root(x^11)
I rewrote the whole equation in simplest form 25x^(11/10)4√y
How do I rewrite it with radical exponents?
is 4√y supposed to mean 4th root of y?
x^(11/10) is 10th-root(x^11)
Step 1: Simplify the expression inside the rational exponent.
In this case, the expression inside the rational exponent is x^(11/10). To simplify it, we need to find the nth root of x, where n is the denominator of the rational exponent. So, the 10th root of x is x^(1/10).
Step 2: Rewrite the rational exponent using the nth root.
Now that we've simplified the expression inside the rational exponent, we can rewrite the original equation using radical exponents. The equation becomes:
25 * (x^(1/10))^11 * √y
Step 3: Simplify further if possible.
In this case, we can simplify the expression (x^(1/10))^11. This is equal to x^(1/10 * 11) = x^(11/10).
Step 4: Combine the remaining terms.
Now we have:
25 * x^(11/10) * √y
And that's how you rewrite the equation using radical exponents: 25 * x^(11/10) * √y.