Given that for a reaction of order n. the intergrated form of the rate equation isk= (1)/(t(n-1))[(1)/(C^(n-1))-(1)/(C_(0)^(n-1))] where C_(0) and C are the values after time t. What is the relationship between t_(3//4) and t_(1//2) where t_(3//4) is the time required for C to become 1//4C_(0)-

Given that for a reaction of order n. the intergrated form of the rate

1.	Given that for a reaction of order n. the intergrated form of the rate equation isk= (1)/(t(n-1))[(1)/(C^(n-1))-(1)/(C_(0)^(n-1))] where C_(0) and C are the values after time t. What is the relationship between t_(3//4) and t_(1//2) where t_(3//4) is the time required for C to become 1//4C_(0)-
Answer» `t_(3//4) = t_(1//2)[2^(n-1) +1]` `t_(3//4) =t_(1//2)[2^(n-1)-1]` `t_(3//4) =t_(1//2) [2^(n+1) -1]` `t_(3//4) =t_(1//2) [2^(n+1)+1]` Solution :`t_(3//4)(1)/(K(n-1))[(1)/(((C_(0))/(4))^(n-1))-(1)/(C_(0)^(n-1)]]` `= (1)/(k(n-1)) (4^(n-1)-1)C_(0)^(n-1)` `:. t_(1//2)=(1)/(K(n-1))(2^(n-1)-1)` `So (t_(3//4))/(t_(1//2)) =2^(n-1)+1`

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Given that for a reaction of order n. the intergrated form of the rate equation isk= (1)/(t(n-1))[(1)/(C^(n-1))-(1)/(C_(0)^(n-1))] where C_(0) and C are the values after time t. What is the relationship between t_(3//4) and t_(1//2) where t_(3//4) is the time required for C to become 1//4C_(0)-

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