Find the integral solution for `n_(1)n_(2)=2n_(1)-n_(2), " where " n_(1),n_(2) in "integer"`.

Find the value of n , if (2n - 1)/(n - 2) = 3

The electron in a hydrogen atom make a transtion n_(1) rarr n_(2) where n_(1) and n_(2) are the priocipal quantum number of the two states . Assume the Bohr model to be valid . The time period of the electron in the initial state is eight time that in the final state . The possible values of n_(1) and n_(2) are

In case of hydrogen spectrum wave number is given by barv=R_(H)[(1)/(n_(1)^(2))-(1)/(n_(2)^(2))] where n_(1)gtn_(2) {:(,"ColumnI",,"ColumnII"),((A),"Lyman series",(P),n_(2)=2),((B),"Balmer series",(Q),n_(2)=3),((C),"Pfund series",(R),n_(2)=6),((D),"Brackett series",(S),n_(2)=5):}

Evaluate sin{ n pi+(-1)^(n) (pi)/(4) , where n is an integer.

Write the middle term in the expansion of : (1+x)^(2n) , where n is a positive integer.

Show that the middle term in the expansion of (1+x)^(2n) is (1.3.5….(2n-1))/(n!) 2^(n)x^(n) , where n is a positive integer.

In the expansion of (x^(2) + 1 + (1)/(x^(2)))^(n), n in N ,

Show that the integral part of (5 sqrt(5) + 11)^(2n +1) is even where n in N .

For positive integers n_1,n_2 , the value of the expression : (1+i)^(n_1)+(1+i^3)^(n_1) +(1+i^5)^(n_2)+ (1+i^7)^(n_2) , where i= sqrt(-1) is a real number if and only if :

Find the value of (3^n × 3^(2n + 1))/(3^(2n) × 3^(n - 1))