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Which are the correct steps to follow to simplify an exponential expression using the Quotient Rule of Integer Exponents? (1 po...Asked by eeeeee
Which are the correct steps to follow to simplify an exponential expression using the Quotient Rule of Integer Exponents?(1 point) Responses Check if the bases are different; if they are, subtract the exponents of the numerator and denominator; and write the resulting expression in exponential form. Check if the bases are different; if they are, subtract the exponents of the numerator and denominator; and write the resulting expression in exponential form. Check if the bases are the same; if they are, subtract the exponents of the numerator and denominator (leave as-is otherwise); and write the resulting expression in exponential form. Check if the bases are the same; if they are, subtract the exponents of the numerator and denominator (leave as-is otherwise); and write the resulting expression in exponential form. Subtract the exponents of the numerator and denominator; and write the resulting expression in exponential form. Subtract the exponents of the numerator and denominator; and write the resulting expression in exponential form. Check if the bases are the same; if they are, add the exponents of the numerator and denominator (leave as-is otherwise); and write the resulting expression in exponential form.
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The correct steps to follow to simplify an exponential expression using the Quotient Rule of Integer Exponents are:
**Check if the bases are the same; if they are, subtract the exponents of the numerator and denominator (leave as-is otherwise); and write the resulting expression in exponential form.**
This means that when you have an expression of the form \(\frac{a^m}{a^n}\) (where \(a\) is the base), you simplify it as \(a^{m-n}\), assuming that \(a\) is not zero. If the bases are different, you cannot apply the Quotient Rule directly, and you would leave the expression as-is.
**Check if the bases are the same; if they are, subtract the exponents of the numerator and denominator (leave as-is otherwise); and write the resulting expression in exponential form.**
This means that when you have an expression of the form \(\frac{a^m}{a^n}\) (where \(a\) is the base), you simplify it as \(a^{m-n}\), assuming that \(a\) is not zero. If the bases are different, you cannot apply the Quotient Rule directly, and you would leave the expression as-is.
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