DIFFERENTIATION#!#INTEGRATION

Concentration dependence of rate is called differential rate equation. Integrated differential equations give relation between directly measured experimental data i.e., concentration at different times and rate constant. The integrated rate equations are different for the reactions of differennt reaction orders. the first-order reaction has a rate constant 1.15xx10^(-3)s^(-1) . Q. For a reaction, A+H_(2)O to B Rate prop[A] The order of the reaction is:

Recap|Physical Signficance Of Differentiation|Basics Of Integration|Physical Signficance Of Integration|OMR|Summary

Evaluating integrals dependent on a parameter: Differentiate I with respect to the parameter within the sign an integrals taking variable of the integrand as constant. Now evaluate the integral so obtained as a function of the parameter then integrate then result of get I. Constant of integration can be computed by giving some arbitrary values to the parameter and the corresponding value of I. The value of (dI)/(da) when I=int_(0)^(pi//2) log((1+asinx)/(1-asinx)) (dx)/(sinx) (where |a|lt1 ) is

Use of Differentiation|Integration

Differentiation and Integration in Kinematics

Multinomial theorem || Use OF differentiation and Integration || Important questions

Evaluating integrals dependent on a parameter: Differentiate I with respect to the parameter with in the sign an integrals taking variable of the integrand as constant. Now evaluate the integral so obtained as a function of the parameter then integrate then result of get I. Constant of integration can be computed by giving some arbitrary values to the parameter and the corresponding value of I. The value of int_(0)^(1)(x^(a)-1)/(logx)dx is

Evaluating integrals dependent on a parameter: Differentiate I with respect to the parameter within the sign an integrals taking variable of the integrand as constant. Now evaluate the integral so obtained as a function of the parameter then integrate then result of get I. Constant of integration can be computed by giving some arbitrary values to the parameter and the corresponding value of I. The value int_(0)^(pi//2)log(sin^(2)theta+k^(2)cos^(2)theta)d theta , where kge0, is

Evaluating integrals dependent on a parameter: Differentiate I with respect to the parameter within the sign an integrals taking variable of the integrand as constant. Now evaluate the integral so obtained as a function of the parameter then integrate then result of get I. Constant of integration can be computed by giving some arbitrary values to the parameter and the corresponding value of I. If int_(0)^(pi)(dx)/((a-cosx))=(pi)/(sqrt(a^(2)-1)) , then the value of (dx)/((sqrt(10)-cosx)) is

The Integrating Factor of the differential equation x(dy)/(dx)-y=2x^2 is