Question 26 - CBSE Class 12 Sample Paper for 2018 Boards - Solutions of Sample Papers and Past Year Papers - for Class 12 Boards
Last updated at Sept. 24, 2021 by Teachoo
Hello! Teachoo has made this answer with days (even weeks!) worth of effort and love. Since your board exams are coming, why not help Teachoo create more videos and content by supporting us? Please click on this link to make a donation
Using integration, find the area in the first quadrant bounded by the curve y = x|x|, the circle x
2
+ y
2
= 2 and the y-axis
This is a question of CBSE Sample Paper - Class 12 - 2017/18.
Hello! Teachoo has made this answer with days (even weeks!) worth of effort and love. Since your board exams are coming, why not help Teachoo create more videos and content by supporting us? Please click on this link to make a donation
Question 26
Using integration, find the area in the first quadrant bounded by the curve y = π₯|π₯|, the circle x2 + y2 = 2 and the y-axis
Given
y = π₯|π₯|
y = {β(π₯Γπ₯, π₯β₯0@π₯ Γ(βπ₯), π₯<0)β€
y = {β(π₯^2, π₯β₯0@βπ₯^2, π₯<0)β€
And
x2 + y2 = 2
(x β 0)2 + (y β 0)2 = (β2)^2
So, it is a circle with center (0, 0)
and Radius = β2
Question 26
Using integration, find the area in the first quadrant bounded by the curve y = π₯|π₯|, the circle x2 + y2 = 2 and the y-axis
Given
y = π₯|π₯|
y = {β(π₯Γπ₯, π₯β₯0@π₯ Γ(βπ₯), π₯<0)β€
y = {β(π₯^2, π₯β₯0@βπ₯^2, π₯<0)β€
And
x2 + y2 = 2
(x β 0)2 + (y β 0)2 = (β2)^2
So, it is a circle with center (0, 0)
and Radius = β2
π=γβπγ^π for x < 0
π=γβπγ^π for x < 0
Combining, we form graph
We need to find Area OAB
First we find point B
Point B is point of intersection of circle and parabola
Now,
equation of circle is
π₯^2+π¦^2=2
Putting x2 = y
π¦+π¦^2=2
π¦^2+π¦β2=0
π¦^2+2π¦βπ¦β2=0
π¦(π¦+2)β1(π¦+2)=0
(yβ1)(π¦+2)=0
So, y = 1, y = β2
So, y = 1, y = β2
Since y is in 1st quadrant, it is positive
β΄ y = 1
Now,
y = x2
1 = x2
x2 = 1
x = Β± β1
x = Β± 1
β΄ x = 1, β1
Since x is in 1st quadrant
x = 1
β΄ x = 1, y = 1
So, point B = (1, 1)
Area Required = Area AODB β Area ODB
Area AODB
Area AODB = β«_0^1βγπ¦ ππ₯γ
For circle
x2 + y2 = 2
y2 = 2 β x2
y = Β± β(2βπ₯^2 )
Since AODB is in 1st quadrant
y =β(2βπ₯^2 )
β΄ Area AODB = β«_0^1ββ(2βπ₯^2 ) ππ₯
= β«_0^1ββ((β2)^2βπ₯^2 ) ππ₯ It is of form
β(π^2βπ₯^2 ) ππ₯=π₯/2 β(π^2βπ₯^2 )+π^2/2 γπ ππγ^(β1)β‘γ π₯/π+πγ
Here, a = β2
= [π₯/2 β((β2)^2βπ₯^2 )+(β2)^2/2 γπ ππγ^(β1)β‘γ π₯/β2γ " " ]_0^1
= [π₯/2 β(2βπ₯^2 )+2/2 γπ ππγ^(β1)β‘γ π₯/β2γ " " ]_0^1
= [π₯/2 β(2βπ₯^2 )+γπ ππγ^(β1)β‘γ π₯/β2γ " " ]_0^1
= [1/2 β(2β1^2 )+γπ ππγ^(β1)β‘γ 1/β2γ " " ] β [0/2 β(2β0^2 )+γπ ππγ^(β1)β‘γ 0/β2γ " " ] = [1/2 β(2β1)+γπ ππγ^(β1)β‘γ 1/β2γ " " ] β [0+γπ ππγ^(β1)β‘0 " " ] = [1/2+γπ ππγ^(β1)β‘γ 1/β2γ " " ] β [0+0" " ]
= 1/2+π/4
Area ODB
Area ODB = β«_0^1βγπ¦ ππ₯γ
For parabola
y = x2
β΄ Area ODB = β«_0^1βπ₯^2 ππ₯
= [π₯^3/3]_0^1
=1^3/3β0^3/3 = 1/3
Thus,
Area Required = Area AODB β Area ODB
= 1/2+π/4 β 1/3
= 1/2β1/3+π/4
= π/π+π /π square units
Made by
Davneet Singh
Davneet Singh is a graduate from Indian Institute of Technology, Kanpur. He has been teaching from the past 12 years. He provides courses for Maths and Science at Teachoo.
