The largest real value for x such that `sum_(k=0)^4((5^(4-k))/((4-k)!))((x^k)/(k !))=8/3` is

The largest real value of x such that sum_(k=0)^4((3^(4-k))/((4-k)!))((x^k)/(k !))=(32)/3 is.

Find the largest real value of x such that sum_(k=0)^4((3^(4-k))/((4-k)!))((x^k)/(k !))=(32)/3 .

Find the largest real value of x such that sum_(k=0)^4((3^(4-k))/((4-k)!))((x^k)/(k !))=(32)/3 .

The largest real value of x such that sum_(k=0)^(4)((3^(4-k))/((4-k)!))((x^(k))/(k!))=(32)/(3) is.

Y = sum_ (k = 0) ^ (5) x ^ (k) a ^ (k-1)

The number of real roots of equation sum_(k=1)^(oo)(x-k^(k))^(7)=0;(n>5)

Value of k' so that f(k)=int_(0)^(4)|4x-x^(2)-k|dx is minimum is-

Determine the value of k such that the equation (2k-5)x^2-4x-15=0 and (3k-8)x^2-5x-21=0 may have a common root.

Find the value of k, if (3x-4)/((x-3)(x+k))=(1)/(x-3)+(2)/(x+k)