Let `h(x)=x^(m/n)` for `x in R ,` where +m and n are odd numbers and `0

Let h(x)=x^(m/n) for x in R , where m and n are odd numbers where 0 < m < n. Then y= h(x) has a. no local extremums b. one local maximum c. one local minimum d. none of these

Let h(x)=x^(m/n) for x in R , where m and n are odd numbers where 0 < m < n. Then y= h(x) has a. no local extremums b. one local maximum c. one local minimum d. none of these

Let f(x)=x^((m)/(n)) for x in R where m and n are integers,m even and n odd and '0

Let f(x)=x^(m/n) for x in R where m and n are integers , m even and n odd and 0

Let the area of the region {(x,y):x-2y+4ge 0 , x+2y^(2) ge 0,x+4y^(2)le8,y ge 0} be (m)/(n) ,where m and n , are coprime numbers. Then m+n is equal to

Let f(x)=|2x^(2)+5|x|-3|,x in R .If "m" and "n" denote the number of points where "f" is not continuous and not differentiable respectively,then "m+n" is equal to:

x^(m)xx x^(n)=x^(m+n) , where x is a non zero rational number and m,n are positive integers.

Evaluate Lt_(xtooo)(a_(0)x^(m)+a_(1)x^(m-1)+...+a_(m))/(b_(0)x^(n)+b_(1)x^(n-1)+...+b_(n)) where m and n are positive integers and a_(0)ne0,b_(0)ne0 .

Consider (1 + x + x^(2))^(n) = sum_(r=0)^(n) a_(r) x^(r) , where a_(0), a_(1), a_(2),…, a_(2n) are real number and n is positive integer. If n is odd , the value of sum_(r-1)^(2) a_(2r -1) is