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Simplify. Express your answer using positive exponents.\newline3h(3h)(h7)\frac{3h}{(3h)(h^7)}

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Full solution

Q. Simplify. Express your answer using positive exponents.\newline3h(3h)(h7)\frac{3h}{(3h)(h^7)}
  1. Write Expression Components: Write down the expression and identify the components that can be simplified. 3h(3h)(h7)\frac{3h}{(3h)(h^7)} can be rewritten as 3h3h×h7\frac{3h}{3h \times h^7}.
  2. Simplify by Canceling Factors: Simplify the expression by canceling out common factors in the numerator and the denominator.\newlineThe 3h3h in the numerator and one 3h3h in the denominator cancel each other out, leaving us with 1h7\frac{1}{h^7}.
  3. Final Simplified Form: Since there are no more common factors and the expression is already using positive exponents, we have our simplified expression.\newlineThe final simplified form is 1h7\frac{1}{h^7}.

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