Simplify using binomial theorem
`E=A((1y +(DeltaT)/T_0)-1)`
`E=A((1+(DeltaT)/T_0)^4-1)` where `DeltaT` is very samall compared to `T_0`

Expand using Binomial Theorem (1+ x/2 - 2/x)^4 , x!= 0.

If A = ((3,1),(0,2)) show that (A^(T))^(-1) = (A^(-1))^(T) where A^(T) is the transpose of A .

IF rho is the resistivity at temperature T, then the temperature coefficient of resistivity is defined as alpha=(1drho)/(rhodT) , which is a constant physical quantity for a given metal, show that rho=rho_0e^(a(T-T_0)), where rho_0 = resistivity at temperature T_0 .

Prove that the change in the time period t of a simple pendulum due to a change DeltaT of temperature is, Deltat=1/2alphatDeltaT , where alpha = coefficient of linear expansion.

If lambda=int_0^1(e^t)/(1+t) , then int_0^1e^tlog_e(1+t)dt is equal to

If alpha,beta,gamma,delta are four complex numbers such that gamma/delta is real and alpha delta - beta gamma !=0 then z = (alpha + beta t)/(gamma+ deltat) where t is a rational number, then it represents:

If y(t) is a solution of (1+t)dy/dt-t y=1 and y(0)=-1 then y(1) is

(1)/(4) T T, (1)/(2)Tt,(1)/(4) t t is binomial expansion of

If b=int_(0)^(1) (e^(t))/(t+1)dt , then int_(a-1)^(a) (e^(-t))/(t-a-1) is

If x<0,t h e ntan^(-1)x is equal to