First you need to find the order of reaction.
Let the reaction follow a simple nth order rate law:
rate = kโ[A]โฟ
Half-life tโโ initial concentration [A]โ and rate constant k for such a reaction are related as:
tโโ = (2โฟโปยน - 1) / ( (n - 1)โkโ[A]โโฟโปยน )
except the particular case of first order reactions, i.e. n=1, in which half-life does not depend on initial concentration:
tโโ = ln(2)/k
Apparently your reaction is not a first order reaction. When you combine the constant factors in the relation above to a constant K, you can see that half-life of a non-first order reaction is inversely proportional to initial concentration raised to the power (n-1):
tโโ = K/[A]โโฟโปยน
with K=(2โฟโปยน - 1)/((n - 1)โk)
K cancels out when you take the ratio of the two given half-lifes:
tโโโโโ / tโโโโโ = (K/[A]โโโโโฟโปยน) / (K/[A]โโโโโฟโปยน) = ([A]โโโโ/[A]โโโโ)โฟโปยน
to find the exponent (n-1) take logarithm
ln(tโโโโโ/tโโโโโ) = ln(([A]โโโโ/[A]โโโโ)โฟโปยน) = (n - 1)โln([A]โโโโ/[A]โโโโ)
=>
n - 1 = ln(tโโโโโ/tโโโโโ) / ln([A]โโโโ/[A]โโโโ)
= ln(229s / 151s) / ln(0.297M / 0.196M )
= 1.00198...
โ 1
=>
n = 2
With known order n we can compute k from given half-life and initial concentration.
For a second order reaction half-life is given by:
tโโ = (2ยฒโปยน - 1) / ( (2 - 1)โkโ[A]โยฒโปยน ) = 1/(kโ[A]โ)
Hence
k = 1/(tโโโ[A]โ)
= 1/(151s โ 0.297M)
= 2.23ร10โปยฒ Mโปยนsโปยน
