Evaluate the expression. Express your answer to the nearest whole number. \( \frac{106}{95} \times \frac{20}{15} \times \frac{67}{1.6}= \) Enter a number as an exact integer or decimal.
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To evaluate the expression \( \frac{106}{95} \times \frac{20}{15} \times \frac{67}{1.6} \), let's calculate it step by step. 1. Calculate \( \frac{20}{15} \): \[ \frac{20}{15} = \frac{4}{3} \] 2. Now substitute this back into the expression: \[ \frac{106}{95} \times \frac{4}{3} \times \frac{67}{1.6} \] 3. Next, calculate \( \frac{67}{1.6} \): \[ \frac{67}{1.6} = 41.875 \] 4. Now combine everything: \[ \frac{106}{95} \times \frac{4}{3} \times 41.875 \] 5. Calculate \( \frac{106}{95} \): \[ \frac{106}{95} \approx 1.115789 \] 6. Now substitute back in: \[ 1.115789 \times \frac{4}{3} \times 41.875 \] 7. Calculate \( \frac{4}{3} \): \[ \frac{4}{3} \approx 1.333333 \] 8. Combine the previous calculations: \[ 1.115789 \times 1.333333 \times 41.875 \] 9. First multiply \( 1.115789 \times 1.333333 \): \[ \approx 1.489 \] 10. Finally, multiply by \( 41.875 \): \[ 1.489 \times 41.875 \approx 62.2 \] Therefore, rounding to the nearest whole number, the final result is \( 62 \).