If S(0),S(1),S(2),… are areas bounded by...

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…

Text Solution

Verified by Experts

`y= sin pi sqrt(x)` meets x-axis when `pisqrt(x)=npi or x=n^(2), n in N.` Therefore, area of half-wave between `x=n^(2) and x=(n+1)^(2)` is
`S_(n)=|overset((n+1)^(2))underset(n^(2))int sin pi sqrt(x)dx |`
`"Putting "pisqrt(x)=y and pi^(2) dx =2y dy,`we get
`therefore" "S_(n)=|(2)/(pi^(2))overset((n+1)pi)underset(npi)inty sin y dy |`
`=|(2)/(pi^(2))[-y cos y + sin y ]_(npi)^((n+1)pi)|`
`=|(2)/(pi^(2))[-(n+1)pi cos (n+1) pi +npi cos n pi ]|`
`=(2(2n+1))/(pi), n in N`
`"Hence, "S_(0),S_(1),S_(2),...` are in A.P..

Topper's Solved these Questions

AREA
CENGAGE PUBLICATION|Exercise Concept Application Exercise 9.1|9 Videos
AREA
CENGAGE PUBLICATION|Exercise Concept Application Exercise 9.2|14 Videos
AREA
CENGAGE PUBLICATION|Exercise Comprehension Type|2 Videos
APPLICATIONS OF DERIVATIVES
CENGAGE PUBLICATION|Exercise Subjective Type|2 Videos
BINOMIAL THEOREM
CENGAGE PUBLICATION|Exercise Comprehension|11 Videos

Similar Questions

Explore conceptually related problems

Find the area bounded by x=2y-y^2 and the y-a x i s .

Find the area bounded by the curve y=sin^(-1)x and the line x=0,|y|=pi/2dot

If in Delta ABC, (a -b) (s-c) = (b -c) (s-a) , prove that r_(1), r_(2), r_(3) are in A.P.

If S_(1), S_(2), S_(3) are the sums of n natural numbers, their squares, their cubes respectively show that 9S_(2)^(2) = S_(3)(1+8S_(1)) .

Sixteen players S_(1) , S_(2) , S_(3) ,…, S_(16) play in a tournament. Number of ways in which they can be grouped into eight pairs so that S_(1) and S_(2) are in different groups, is equal to

If S_(1), S_(2), S_(3) be respectively the sums of n, 2n and 3n terms of a G.P., prove that, S_(1)(S_(3) - S_(2)) = (S_(2) - S_(1))^(2) .

The parabolas y^(2)= 4x and x^(2) = 4y divide the square region bounded by the line x = 4 , y = 4 and the coordinate axes into three parts. If S_(1), S_(2), S_(3) are respectively the areas of these three parts numbered from top to bottom then S_(1) : S_(2) : S_(3) is-

If S is the area bounded byb the curve y =sqrt( 1-x^(2)) and y= x^(3) -x then the value of (pi)/( S) is equal to-

If s_1 be the sum of (2n+1) terms of an A.P and s_2 be the sum its odd terms, then prove that s_1:s_2=(2n+1):(n+1)

CENGAGE PUBLICATION-AREA-Solved Examples

Find the area bounded by the curve x^2=y ,x^2=-y and y^2=4x-3
Text Solution
|
Find the area of the region enclosed by the curve y=|x-(1)/(x)|(xgt0) ...
Text Solution
|
Find the area of the region bounded by the curves y=x^2,y=|2-x^2|,a n ...
Text Solution
|
The ratio in which the line x-1=0 divides the area bounded by the curv...
Text Solution
|
If S(0),S(1),S(2),… are areas bounded by the x-axis and half-wave of t...
Text Solution
|
Find the area of the figure enclosed by the curve 5x^2+6x y+2y^2+7x+6y...
Text Solution
|
Find the area bounded by the curves x^2+y^2=4,x^2=sqrt(2)y ,a n dx=ydo...
Text Solution
|
Find the area of the region bounded by the curve C : y=tan x ,tangent ...
Text Solution
|
Compute the area of the region bounded by the curves y-e x(log)e xa n ...
Text Solution
|
If An be the area bounded by the curve y=(tanx)^n and the lines x=0,\ ...
Text Solution
|