A body at temperature theta_(0) having Newton's cooling constant K is placed in a surrounding having temperature T_(0) at time t = 0. The graph of temperature of the body as a function of timet is shown in the adjacent figure.A tangent on the curve is drawn at t = 0 as shown in the figure. Find the value of tau.

A body at temperature theta_(0) having Newton's cooling constant K is

1.	A body at temperature theta_(0) having Newton's cooling constant K is placed in a surrounding having temperature T_(0) at time t = 0. The graph of temperature of the body as a function of timet is shown in the adjacent figure.A tangent on the curve is drawn at t = 0 as shown in the figure. Find the value of tau.
Answer» K `(1)/(K)` `K(Q_(0)-T_(0))` Data insufficient Solution :`mgsintheta-f_(S)=ma_(C.M.)` `(f_(s))R=((2)/(5)MR^(2))alpha` `impliesf_(s)=(2)/(5)ma_(C.M)` `implies mgsintheta=(7)/(5)ma_(C.M)implies a_(C.M)=(5)/(7)gsintheta` For time of descent `(1)/(2)a_(C.M)t^(2)=hcosectheta` `t^(2)=(2H)/(a_(C.M))cosectheta` `t^(2)=(2hxx7)/(5gsin theta)cosectheta` `t^(2)=(14H)/(5g)(1)/(sin^(2)theta)implies t=sqrt((14h)/(5g))(1)/(sin theta)&V_(F)=(a_(C.M))t=((5)/(7)gsina)(sqrt((14h)/(5g)))(1)/(sin theta)` `V_(F)=sqrt((5xx2gh)/(7))=sqrt((10gh)/(7))`implies VELOCITY does not depend or `'theta'` but time depend on `'theta'`

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