[" Given that for each "],[a in(0,1),lim...

[" Given that for each "],[a in(0,1),lim_(h rarr0^(+))int_(h)^(1-h)t^(-a)(1-t)^(a-1)dt],[" exits.Let this limit be "g(a)" .In addition,it is "],[" given that the function "g(a)" is differentiable "],[" on "(0,1)]

Similar Questions

Explore conceptually related problems

Given that for each a epsilon(0,1),lim(hto 0^(+)) int_(h)^(1-h)t^(-a)(1-t)^(a-1)dt exists. Let this limit be g(a) . In addition it is given the function g(a) is differentiable on (0,1) . The value of g(1/2) is

Given that for each a epsilon(0,1),lim_(hto 0^(+)) int_(h)^(1-h)f^(-a)(1-t)^(a-1)dt exists. Let this limit be g(a) . In addition it is given the function g(a) is differentiable on (0,1) . The value of g(1/2) is

lim_(h rarr0)(sin h)/(h)

lim_(h rarr0)h sin(1/h)

Given that for each a in (0,1) lim^(h to 0^(+)) int_(h)^(1-h) t^(-a)(1-t)^(a-1)dt exists. If this limit be g(a), then the value g((1)/(2)) , is

lim_(h rarr0)(sin(x+h)-sinx)/(h)

lim_(h rarr0^(-))((2e^(-1/h)-3)/(1-3e^(-1/h))) is

Given that for each a in (0,1)lim_(x to 0) int_(h)^(-h) t^(-a)(1-t)^(a-1)dt exits and is equal to g(a).If g(a) is differentiable in (0,1), then the value of g'((1)/(2)) , is

lim_(x rarr0)x((1)/(x+h)-(1)/(x))

[" Given that for each "],[a in(0,1),lim_(h rarr0^(+))int_(h)^(1-h)t^(-a)(1-t)^(a-1)dt],[" exits.Let this limit be "g(a)" .In addition,it is "],[" given that the function "g(a)" is differentiable "],[" on "(0,1)]

Similar Questions

Recommended Questions