(b) $N=\frac{N_0 e^{\frac{t}{\tau}}}{1+\frac{N_0}{N_s}\left[e^{\frac{t}{\tau}}-1\right]}$ at $t =0, N = N _0$ $t \rightarrow \infty, N = N _{

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The polulation curve will have an inflection point when $N ( t )$ is $N _{ s } / 2$.

(b) $N=\frac{N_0 e^{\frac{t}{\tau}}}{1+\frac{N_0}{N_s}\left[e^{\frac{t}{\tau}}-1\right]}$ at $t =0, N = N _0$ $t \rightarrow \infty, N = N _{ S }$ and since $N_S > > N_0 \therefore$ it is an increasing If we find $\frac{d N}{d t}=0$, no ' $t$ ' exist. since $A , C , D$ are wrong $\therefore B$ is correct.

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The cumulative number of ill patients $N( t )$ during an epidemic in a country is given by the following equation $N(t)=\frac{N_0 \exp (t / \tau)}{1+N_0(\exp (t / \tau)-1) / N_s}$ where $N _0$ is the initial population of ill patients, $\tau$ a positive constant and $N _5\left( > > N _0\right)$ is a large number. Then, which of the following statements is true ?

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A
At large time $N ( t )$ will approach zero.
B
The polulation curve will have an inflection point when $N ( t )$ is $N _{ s } / 2$.
C
$N ( t )$ will decrease monotonically.
D
$N( t )$ will exhibit a maximum.

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$A$ ball moving with velocity $2 \ m/s$ collides head-on with another stationary ball of double the mass. If the coefficient of restitution is $0.5$,then their velocities (in $m/s$) after collision will be

Identify the product $(C)$ in the following series of reactions:Cyclopentane $\xrightarrow{Br_2 (1 \ eq), h\nu} (A)$ $\xrightarrow{Alc. KOH} (B)$ $\xrightarrow{NBS} (C)$

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Identify the product $(C)$ in the following series of reactions:
Cyclopentane $\xrightarrow{Br_2 (1 \ eq), h\nu} (A)$ $\xrightarrow{Alc. KOH} (B)$ $\xrightarrow{NBS} (C)$