i don't know what to do when their is a smaller number on top

Give an example and tell us what you don't understand.

(-c)2d7/c2d6

d

i just don't get it do u have some examples?

What is X squred minus 5X plus 4 divided by X minus 1

(4^t)(8t^5)

(-z)6/(-z)3 is it postive or negative answer?

i'm so confused on how to answer:
s-3(negative 3rd power)t15(negative 5th power) / (divided by) (s2t3)-1(multiplied by a negative power to the first)

12x^7/4x^5

i understand how to divide easy monomial problems, like: 4(to the 12th power) x 4(to the 2nd power) = 4(to the 10th power). i also understand how to divide negative powers. but, wut i don't understand is how you divide a problem like this:
} 4c(-2nd power)d / b(-2nd power)c(3rd power)d(-1st power) } .all to the 0 power.

this is confusing. i don't get how to do this. help me.

I'm learning how to divide by monomials in my freshman high school class and we just learned that if everything is to the power of zero, then the whole problem equals 1 no matter what!

Im completley lost

positive

c^0/c^-3 (c to the zero power devided by c to the negative three power)

Im a Sophomore and ed at math... help me please...

-52x to the 3rd y to the 2nd and z divided by 13xy to the 2nd don't get it

i need to no how to divide a monomails witha power to a power

(g2h)3 x g-2h4)-6

-27 bc 85 bc -30 bc

5

x/4 a monomial

To help you understand how to approach these problems, I will explain the steps involved in solving each one. Let's start with the first example:

(-c)2d7/c2d6

Step 1: Simplify the expressions inside the parentheses:
(-c)2 becomes c2

Step 2: Apply the division rule for exponents:
c2d7/c2d6 becomes c^(2-2)d(7-6) = cd

So, the answer is cd.

Next, let's move on to the second example:

What is X squared minus 5X plus 4 divided by X minus 1?

Step 1: Factor the numerator if possible:
The numerator, X squared minus 5X plus 4, can be factored as (X-1)(X-4).

Step 2: Simplify the expression by canceling out common factors:
(X-1)(X-4) / (X-1) = X-4

So, the answer is X-4.

Now, let's look at the third example:

(4^t)(8t^5)

Step 1: Multiply the constants:
4^t * 8 = 32^t

Step 2: Multiply the variables:
t * t^5 = t^(1+5) = t^6

Combine the results to get:
32^t * t^6

Moving on to the fourth example:

(-z)^6 / (-z)^3, is the answer positive or negative?

Step 1: Apply the division rule for exponents:
(-z)^6 / (-z)^3 becomes (-z)^(6-3) = (-z)^3

Since (-z)^3 denotes raising a negative number to an odd power, the answer is negative.

Now, let's tackle the fifth example:

s-3 * t15 / s2t3-1

Step 1: Apply the division rule for exponents:
s-3 * t15 / s2t3-1 becomes s(-3-2) * t(15-3+1) = s-5 * t13

So, the answer is s-5 * t13.

Next, let's move on to the sixth example:

12x^7 / 4x^5

Step 1: Simplify the expression by canceling out common factors:
12x^7 / 4x^5 can be simplified to 3x^(7-5) = 3x^2

So, the answer is 3x^2.

Now, for the seventh example:

4c(-2)^d / b(-2)c^3d(-1)^0

Step 1: Apply the power of zero property:
Any non-zero number or variable raised to the power of zero is equal to 1.

So, the expression becomes:
4c(-2)^d / b(-2)c^3d(1) = 4c^0 / b^0c^3 = 4 / c^3

The answer is 4 / c^3.

Now, let's move on to the eighth example:

c^0 / c^-3

Step 1: Apply the division rule for exponents:
c^0 / c^-3 becomes c^(0-(-3)) = c^3

So, the answer is c^3.

Lastly, let's look at the ninth example:

-52x^3y^2z / 13xy^2

Step 1: Simplify the expression by canceling out common factors:
-52x^3y^2z / 13xy^2 can be simplified to -4x^(3-1)z = -4xz

So, the answer is -4xz.

I hope these explanations help clarify the steps involved in solving these types of problems. If you have any further questions, please let me know!