x^5/x^7
When dividing terms with the same base, you subtract the exponents:
x^5 / x^7 = x^(5-7) = x^(-2)
Therefore, x^5 / x^7 simplifies to 1/x^2.
To simplify the expression (x^5/x^7), you can use the rules of exponents. When dividing two numbers with the same base, you subtract the exponents.
Here's how it looks step-by-step:
Step 1: Write the expression as (x^5) / (x^7).
Step 2: Apply the rule of exponents. Subtract the exponents: 5 - 7 = -2.
Step 3: Rewrite the expression with the simplified exponent: x^-2.
Therefore, the expression (x^5/x^7) simplifies to x^-2.
To simplify the expression x^5/x^7, we can use the properties of exponents.
When dividing terms with the same base, we subtract the exponents. So, in this case, we subtract the exponent of x in the denominator from the exponent of x in the numerator.
x^5/x^7 = x^(5-7) = x^(-2)
The negative exponent indicates that we have to move the term to the denominator. When a term has a negative exponent, it means it is actually in the denominator of a fraction with a positive exponent. So, x^(-2) can be written as 1/x^2.
Therefore, x^5/x^7 simplified is 1/x^2.