If `x = (99)^(50) + (100)^(50) ` and y = `(101)^(50)` then

The value of 99^(50) - 99.98^(50) + (99*98)/(1*2) (97)^(50) -…+ 99 is

Using binomial theorem, prove that (101)^(50)> 100^(50)+99^(50)dot

Solve cos^(50) x- sin^(50)x=1

Expand |(3, 6), (5,0)|

The coefficient of x^(50) in the series sum_(r=1)^(101)rx^(r-1)(1+x)^(101-r) is

The value of ((50),(0)) ((50),(1)) + ((50), (1)) ((50),(2)) +............+ ((50),(49))((50),(50)) is

If (1+x)^n=sum_(r=0)^n a_r x^r and b_r=1+(a_r)/(a_(r-1)) and prod_(r=1)^n b_r=((101)^(100))/(100!), then n equals to: 99 (b) 100 (c) 101 (d) None of these

If (3/2+(isqrt(3))/2)^(50)=3^(25)(x+iy) , where x and y are reals, then the ordered pair (x,y) is given by

In fig. , if AB || CD , angleAPQ = 50^@ and anglePRD = 127^@ then values of x and y are :

Let A=[(1,0,0),(1,0,1),(0,1,0)] satisfies A^(n)=A^(n-2)+A^(2)-I for n ge 3 . And trace of a square matrix X is equal to the sum of elements in its proncipal diagonal. Further consider a matrix underset(3xx3)(uu) with its column as uu_(1), uu_(2), uu_(3) such that A^(50) uu_(1)=[(1),(25),(25)], A^(50) uu_(2)=[(0),(1),(0)], A^(50) uu_(3)=[(0),(0),(1)] Then answer the following question : Trace of A^(50) equals