As the dimensionless parameter mL increases without bound, fin efficiency η_fin = tanh(mL)/(mL) tends to what value?

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Multiple Choice

As the dimensionless parameter mL increases without bound, fin efficiency η_fin = tanh(mL)/(mL) tends to what value?

As mL grows without bound, the hyperbolic tangent of that argument approaches 1. So tanh(mL) ≈ 1 for very large mL. The fin efficiency is tanh(mL) divided by mL, which for large mL behaves like 1/(mL). Since mL becomes arbitrarily large, 1/(mL) tends to zero. Therefore, the fin efficiency approaches zero.

As the dimensionless parameter mL increases without bound, fin efficiency η_fin = tanh(mL)/(mL) tends to what value?

Prepare for the NANTeL Mechanical Engineering Certification Test with our challenging questions and detailed explanations. Boost your knowledge and confidence now!

As the dimensionless parameter mL increases without bound, fin efficiency η_fin = tanh(mL)/(mL) tends to what value?

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