Consider the area `S_(0),S_(1),S_(2)….` bounded by the x-axis and half-waves of the curve `y=e^(-x) sin x," where "x ge 0.`
The value of `S_(0)` is

Consider the area S_(0),S_(1),S_(2)…. bounded by the x-axis and half-waves of the curve y=e^(-x) sin x," where "x ge 0. Sigma_(n=0)^(oo) S_(n) is equal to

Consider the area S_(0),S_(1),S_(2)…. bounded by the x-axis and half-waves of the curve y=e^(-x) sin x," where "x ge 0. Sigma_(n=0)^(oo) S_(n) is equal to

Prove that the areas S_(0),S_(1),S_(2) ...bounded by the X-axis and half-waves of the curve y=e^(-ax) sin betax,x|0 .from a geometric progression with the common ratio g=e^(-pi alpha//beta) .

Prove that the areas S_(0),S_(1),S_(2) ...bounded by the x -axis and half-waves of the curve y=e^(-ax) sin betax,xge0 form a geometric progression with the common ratio r=e^(-pi alpha//beta) .

If S_(0),S_(1),S_(2),… are areas bounded by the x-axis and half-wave of the curve y=sin pi sqrt(x)," then prove that "S_(0),S_(1),S_(2),… are in A.P…

If S_(0),S_(1),S_(2),… are areas bounded by the x-axis and half-wave of the curve y=sin pi sqrt(x)," then prove that "S_(0),S_(1),S_(2),… are in A.P…

If S_(0),S_(1),S_(2),… are areas bounded by the x-axis and half-wave of the curve y=sin pi sqrt(x)," then prove that "S_(0),S_(1),S_(2),… are in A.P…

Find the area bounded by the y-axis and the curve x = e^(y) sin piy between y = 0, y = 1.

Find the area bounded by the y-axis and the curve x = e^(y) sin piy, y = 0, y = 1 .