`x+(x)/(2) + (x)/(3) lt 11`

The set of all values of x for which ((x+1)(x-3)^(2)(x-5)(x-4)^(3)(x-2))/(x) lt 0

Consider any set of observations x_(1),x_(2),x_(3),..,x_(101) . It is given that x_(1) lt x_(2) lt x_(3) lt .. lt x_(100) lt x_(101) , then the mean deviation of this set of observations about a point k is minimum when k equals

A bag contains 50 tickets 1,2,3,...50 of which 5 are drawn at random and aranged in ascending order of their numbers x_(1) lt x_(2) lt x_(3) lt x_(4) lt x_(5) . Find the number of selections so that x_(3)=30

If x gt 0 , prove that, x-x^(2)/2 lt log (1+x) lt x-x^(2)/(2(1+x))

3x-2 lt 2x+1

Differentiate w.r.t.x the function in Exercises 1 to 11. (sin x- cos x)^( sin x - cos x), (pi)/(4) lt x lt (3pi)/(4) .

In the mean value theorem f(b)-f(a)=(b-a)f'(c ), (a lt c lt b)," if " f(x)=x^(3)-3x-1 and a=-(11)/(7), b=(13)/(7) , find the value of c.

Prove that 3 tan^(-1) x= {(tan^(-1) ((3x - x^(3))/(1 - 3x^(2))),"if " -(1)/(sqrt3) lt x lt (1)/(sqrt3)),(pi + tan^(-1) ((3x - x^(3))/(1 - 3x^(2))),"if " x gt (1)/(sqrt3)),(-pi + tan^(-1) ((3x - x^(3))/(1 - 3x^(2))),"if " x lt - (1)/(sqrt3)):}

Draw the graph of f(x) = {{:(x^(3)","x^(2) lt 1), (x","x^(2) ge 1):}

If e^(A) is defined as e^(A)=I+A+A^(2)/(2!)+A^(3)/(3!)+...=1/2 [(f(x),g(x)),(g(x),f(x))] , where A=[(x,x),(x,x)], 0 lt x lt 1 and I is identity matrix, then find the functions f(x) and g(x).