Step 1: Match Collision Theory.
Collision theory states
\[
\text{Rate}
=
PZ_{AB}e^{-E_a/RT}
\]
Hence
\[
(A)\rightarrow(IV)
\]
Step 2: Match Arrhenius equation.
\[
k=Ae^{-E_a/RT}
\]
Thus
\[
(B)\rightarrow(II)
\]
Step 3: Match zero-order rate constant expression.
\[
[R]=[R]_0-kt
\]
or
\[
k=\frac{[R]_0-[R]}{t}
\]
Hence
\[
(C)\rightarrow(I)
\]
Step 4: Match first-order rate constant expression.
\[
k=\frac{1}{t}\ln\frac{[R]_0}{[R]}
\]
Therefore
\[
(D)\rightarrow(III)
\]
Step 5: Write the correct matching.
\[
(A)-(IV),\ (B)-(II),\ (C)-(I),\ (D)-(III)
\]