For integer ` n gt 1`, the digit at unit's place in the number
` sum_(r=0)^(100) r! + 2^(2^(n))` is equal to

Evaluate sum_(r=1)^(n)rxxr!

Sum of the series sum_(r=1)^(n) (r^(2)+1)r! is

The value of the lim_(n->oo)tan{sum_(r=1)^ntan^(- 1)(1/(2r^2))} is equal to

Let n be 4-digit integer in which all the digits are different. If x is the number of odd integers and y is the number of even integers, then

A derivable function f : R^(+) rarr R satisfies the condition f(x) - f(y) ge log((x)/(y)) + x - y, AA x, y in R^(+) . If g denotes the derivative of f, then the value of the sum sum_(n=1)^(100) g((1)/(n)) is

sum_(r=1)^n(2r+1)=...... .

if 6n tickets numbered 0,1,2,....... 6n-1 are placed in a bag and three are drawn out , show that the chance that the sum of the numbers on then is equal to 6n is (3n)/((6n-1)(6n-2))

Find the remainder when sum_(r=1)^(n)r! is divided by 15, if n ge5 .

Find the sum of the series Sigma_(r=1)^(n) r x^(r-1) using calculus .

Let an denote the number of all n-digit positive integers formed by the digits 0, 1 or both such that no consecutive digits in them are 0. Let b_n = the number of such n-digit integers ending with digit 1 and c_n = the number of such n-digit integers ending with digit 0. The value of b_6 , is