-
Determine as many solutions as you can to each of the following functional equations: 1.f(x) f(x + 1) = f(2 x + 1) 2. f(x) f(x + 1) = f[f(x) + x] ...
-
xy(d^2y/dx^2)+x(dy/dx)^2+y(dy/dx)=0 ...
-
Q1 f:R→ R ;f(x) is continuous funciton satisfying f(x)+f(x2)=2 for all x ε R,the f(x) is a)into b)many one c)constatn d)periodic Q2 If [x] denotes GINT and f(x) =[n+p.sinx],0<x<π ,n ε I and p is a prime no., If p=1 ...
-
If f(x)=\frac{a^x}{a^x +\sqrt{a}} [a>0] then evaluate \sum_{r=1}^{2n-1}{2f(\frac{r}{2n})} ...
-
*Image* ...
-
if a charged particle is projected with velocity v in a region o f electric and mag fields, v, E and B perpendicular to each other...what will happen f E is switched off for some time and then again switched on??? ...
-
What is the charge on the 2mF capacitor? *Image* ...
-
Qn. - Find the structure of compound "D"................ But fr tht we have to find A,B,C obviously....!! :P *Image* ...
