Divide: -39x^4 by underroot13 multiplied by x^2

If you mean

-39x^4/(√13 x^2)
then you have

-3√13 x^2

To divide -39x^4 by √13 multiplied by x^2, follow these steps:

Step 1: Simplify the expression.
-39x^4 ÷ (√13 * x^2)

Step 2: Divide the numerical coefficient (-39) by the numerical coefficient (√13) and combine the variables with the same exponent (x^4 ÷ x^2).
-39 ÷ √13 = (-39/√13)

Step 3: Simplify the exponent.
The exponent of x^4 divided by x^2 leaves us with x^(4-2), which is x^2.

Step 4: Combine the results from steps 2 and 3.
(-39/√13) * x^2

Therefore, the simplified expression is (-39/√13) * x^2.

To divide -39x^4 by sqrt(13) multiplied by x^2, follow these steps:

Step 1: Simplify the expression.
The expression can be simplified as follows:
-39x^4 / (sqrt(13) * x^2)

Step 2: Simplify the numerator.
The numerator, -39x^4, cannot be simplified further.

Step 3: Simplify the denominator.
To simplify the denominator, we need to simplify sqrt(13) * x^2.

First, simplify sqrt(13):
sqrt(13) ≈ 3.6056 (approximately)

Next, simplify x^2:
x^2

Step 4: Simplify the expression.
Now that we have simplified the numerator and denominator, we can divide them to obtain the final answer:
-39x^4 / (sqrt(13) * x^2) ≈ -10.8110x^2