A body cools in a surrounding which is at a constant temperature of $${{\theta }_{0}}$$. Assume that it obeys Newton's law of cooling. Its temperature $$\theta $$ is plotted against time t. Tangents are drawn to the curve at the points $$P(\theta ={{\theta }_{1}})$$ and $$Q(\theta ={{\theta }_{2}})$$. These tangents meet the time axis at angles of $${{\varphi }_{2}}$$and $${{\varphi }_{1}}$$, as shown

Question

TuteeHUB · Accepted Answer

If assertion is true but reason is false.

TuteeHUB · Answer

$$\frac{\tan \,{{\varphi }_{2}}}{\tan \,{{\varphi }_{1}}}=\frac{{{\theta }_{1}}-{{\theta }_{0}}}{{{\theta }_{2}}-{{\theta }_{0}}}$$

TuteeHUB · Answer

$$\frac{\tan \,{{\varphi }_{2}}}{\tan \,{{\varphi }_{1}}}=\frac{{{\theta }_{2}}-{{\theta }_{0}}}{{{\theta }_{1}}-{{\theta }_{0}}}$$

TuteeHUB · Answer

$$\frac{\tan \,{{\varphi }_{1}}}{\tan \,{{\varphi }_{2}}}=\frac{{{\theta }_{2}}}{{{\theta }_{1}}}$$

1.	A body cools in a surrounding which is at a constant temperature of \[{{\theta }_{0}}\]. Assume that it obeys Newton's law of cooling. Its temperature \[\theta \] is plotted against time t. Tangents are drawn to the curve at the points \[P(\theta ={{\theta }_{1}})\] and \[Q(\theta ={{\theta }_{2}})\]. These tangents meet the time axis at angles of \[{{\varphi }_{2}}\]and \[{{\varphi }_{1}}\], as shown
A.	\[\frac{\tan \,{{\varphi }_{2}}}{\tan \,{{\varphi }_{1}}}=\frac{{{\theta }_{1}}-{{\theta }_{0}}}{{{\theta }_{2}}-{{\theta }_{0}}}\]
B.	\[\frac{\tan \,{{\varphi }_{2}}}{\tan \,{{\varphi }_{1}}}=\frac{{{\theta }_{2}}-{{\theta }_{0}}}{{{\theta }_{1}}-{{\theta }_{0}}}\]
C.	If assertion is true but reason is false.
D.	\[\frac{\tan \,{{\varphi }_{1}}}{\tan \,{{\varphi }_{2}}}=\frac{{{\theta }_{2}}}{{{\theta }_{1}}}\]
Answer» C. If assertion is true but reason is false.

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