Simplify x^675/ x^453
To simplify the expression \(\frac{x^{675}}{x^{453}}\), you can apply the quotient rule for exponents, which states that \(x^a / x^b = x^{a-b}\).
Using this rule, you can rewrite the expression as \(x^{675-453} = x^{222}\).
Therefore, the simplified expression is \(x^{222}\).
To simplify the expression x^675 / x^453, you divide the exponents and keep the base.
x^(675-453) = x^222
Thus, the simplified expression is x^222.
To simplify the expression x^675 / x^453, we can use the quotient rule of exponents. According to this rule, when dividing two powers with the same base, we subtract the exponents:
x^675 / x^453 = x^(675 - 453)
Simplifying further, we subtract 453 from 675:
x^(675 - 453) = x^222
Therefore, the simplified form of x^675 / x^453 is x^222.