If sum of series `S=(sqrt2 + 1) + 1 +(sqrt2-1)+.....oo` is given as `(a+bsqrt2)/c`, where `a, b, c in N`) value of `(a+b)/c` ,is

The minimum value of [x_(1)-x_(2))^(2)+(12-sqrt(1-(x_(1))^(2))-sqrt(4x_(2))]^((1)/(2)) for all permissible values of x_(1) and x_(2) is equal to a sqrt(b)-c where a,b,c in N, the find the value of a +b-c

If sum_(t=1)^(1003) (r^(2) + 1)r! = a! - b(c!) where a, b, c in N the least value of (a + b + c) is pqrs then

If sum_(t=1)^(1003) (r^(2) + 1)r! = a! - b(c!) where a, b, c in N the least value of (a + b + c) is pqrs then

If sum_(k = 1)^(oo) (1)/((k + 2)sqrt(k) + ksqrt(k + 2)) = (sqrt(a) + sqrt(b))/(sqrt(c)) , where a, b, c in N and a,b,c in [1, 15] , then a + b + c is equal to

If sum_(k = 1)^(oo) (1)/((k + 2)sqrt(k) + ksqrt(k + 2)) = (sqrt(a) + sqrt(b))/(sqrt(c)) , where a, b, c in N and a,b,c in [1, 15] , then a + b + c is equal to

If a, b are rational numbers and (a-1)(sqrt2)+3=bsqrt(2)+a , then value of (a+b) is :

The minimum value of [x_1-x_2)^2 + ( 12 - sqrt(1 - (x_1)^2)- sqrt(4 x_2)]^(1/2) for all permissible values of x_1 and x_2 is equal to asqrtb -c where a,b,c in N , the find the value of a+b-c

The sum of the series (1)/(sqrt1+sqrt2)+ (1)/(sqrt2+ sqrt3)+ ...+ (1)/(sqrt(n)+sqrt(n+1)) is equal to-

If (3-2sqrt(5))/(6-sqrt(5))=a+bsqrt(c) where a and b are rational numbers, then what are the values of a and b ?