Find T in terms of K, Q and S if S = 2r(\(\piQT + K)
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Correct Answer: Option B
Explanation:
\(\frac{s^2}{4r^2}\) = QT\(\pi\) + KT
\(\frac{s^2}{4r^2}\) - k\(\pi\) = QT\(\pi\)
T = \(\frac{s^2}{4Q\pi r^2}\) - k
\(\frac{s^2}{4r^2}\) = QT\(\pi\) + KT
\(\frac{s^2}{4r^2}\) - k\(\pi\) = QT\(\pi\)
T = \(\frac{s^2}{4Q\pi r^2}\) - k