$${t_{\frac{1}{2}}} = 5\,{\text{years,}}\,T = 15\,{\text{years}}$$      hence total number of half life periods $${\text{ = }}\frac{{15}}{5} = 3$$
∴ Amount left $$ = \frac{{64}}{{{{\left( 2 \right)}^3}}} = 8g$$

$$\eqalign{ & t = \frac{{2.303}}{k}\log \frac{{\left[ {{R_0}} \right]}}{{\left[ R \right]}} \cr & \,\,\, = \frac{{2.303}}{{1.15 \times {{10}^{ - 3}}}}\log \frac{5}{3} \cr & \,\,\, = 2.00 \times {10^3}\,\log \,1.667 \cr & \,\,\, = 2 \times {10^3} \times 0.2219 \cr & \,\,\, = 444\,s \cr} $$

\[\begin{align} & \text{Rate}=-\frac{1}{2}\frac{\Delta \left[ X \right]}{\Delta t} \\ & \,\,\,\,\,\,\,\,\,\,\,=-\frac{1}{2}\frac{\left( 2-3 \right)}{5} \\ & \,\,\,\,\,\,\,\,\,\,\,=0.1\,mol\,{{L}^{-1}}\,{{\min }^{-1}} \\ \end{align}\]

$$\eqalign{ & t = \frac{{2.303}}{k}\log \frac{a}{{a - x}} \cr & = \frac{{2.303}}{6}\log \frac{{0.5}}{{0.05}} \cr & = 0.384\,\min . \cr} $$

$$\eqalign{ & t = \frac{{2.303}}{k}\log \frac{a}{{\left( {a - x} \right)}} \cr & {\text{or}}\,\,t = \frac{{2.303}}{{15 \times {{10}^{ - 3}}}}\log \frac{5}{3} = 34.07\,s \cr} $$

Let order with respect to $$A$$  and $$B$$  are $$x$$  and $$y$$  respectively.
$$\eqalign{ & \therefore \,{\text{Rate}} = k{\left( A \right)^x}{\left( B \right)^y} \cr & \,\,\,\,\,0.1 = k{\left( {0.3} \right)^x}{\left( {0.3} \right)^y}...\left( {\text{i}} \right) \cr & \,\,\,\,\,0.4 = k{\left( {0.3} \right)^x}{\left( {0.6} \right)^y}...\left( {{\text{ii}}} \right) \cr & \,\,\,\,\,0.2 = k{\left( {0.6} \right)^x}{\left( {0.3} \right)^y}...\left( {{\text{iii}}} \right) \cr & {\text{Dividing}}\left( {{\text{ii}}} \right){\text{by}}\left( {\text{i}} \right)\,\frac{{0.4}}{{0.1}} = \frac{{{{\left( {0.6} \right)}^y}}}{{{{\left( {0.3} \right)}^y}}} \cr & \therefore \,y = 2 \cr & {\text{Dividing}}\left( {{\text{iii}}} \right){\text{by}}\left( {\text{i}} \right)\,\frac{{0.2}}{{0.1}} = \frac{{{{\left( {0.6} \right)}^x}}}{{{{\left( {0.3} \right)}^x}}} \cr & \therefore x = 1 \cr & {\text{Rate law will be}}\,{\text{:}}\,{\text{Rate}} = k{\left[ A \right]^1}{\left[ B \right]^2} \cr} $$

Rate of reaction $$ \propto $$ cone. of reactants
As the reaction proceeds, concentration of the reactants decreases hence the rate also keeps on decreasing with time.

$${H_2}$$  decreases three times as fast as that of $${N_2}$$  while $$N{H_3}$$  increases twice as fast as that of $${N_2}$$  decreases.
Hence, Rate $$ = - \frac{1}{3}\frac{{d\left[ {{H_2}} \right]}}{{dt}} = + \frac{1}{2}\frac{{d\left[ {N{H_3}} \right]}}{{dt}}$$

The Arrhenius equation is $${\text{:}}\,\,k = A\,\exp \left( { - {E_a}/RT} \right)$$
as $$T \to \infty ,\,\exp \left( { - {E_a}/RT} \right) \to 1.$$       Hence, $$k=A$$
where $$A,$$ the Arrhenius parameter is $$6.0 \times {10^{14}}{s^{ - 1}}$$
[ NOTE : $$'A'$$  is also known as frequency factor ]

NOTE : Isotopes are atoms of same element having same atomic number but different atomic masses. Neutron has atomic number 0 and atomic mass 1. So loss of neutron will generate isotope. e.g.,
$$_{92}{U^{238}}{ + _0}{n^1}{ \to _{92}}{U^{239}}$$