Find the area bounded by the parabola `y=x^2+1`
and the straight line `x+y=3.`
Text Solution
Verified by Experts
The two curves meet at points where `3-x=x^(2)+1`, `i.e.," "x^(2)+x-2=0` `"or "(x+2)(x-1)=0 or x=-2,1` `therefore" Required area "=int_(-2)^(1)[(3-x)-(x^(2)+1)]dx` `=int_(-2)^(1)(2-x-x^(2))dx` `=[2x-(x^(2))/(2)-(x^(3))/(3)]_(-2)^(1)` `=(2-(1)/(2)-(1)/(3))-(-4-(4)/(2)+(8)/(3))` `=(9)/(2)` sq. units
Topper's Solved these Questions
AREA
CENGAGE|Exercise Exercise 9.1|9 Videos
AREA
CENGAGE|Exercise Exercise 9.2|14 Videos
APPLICATIONS OF DERIVATIVES
CENGAGE|Exercise Question Bank|29 Videos
AREA UNDER CURVES
CENGAGE|Exercise Question Bank|20 Videos
Similar Questions
Explore conceptually related problems
Find the area bounded by the parabola y=2-x^(2) and the straight line y+x=0
Find the area bounded by the parabola y^2=4x and the straight line x+y=3 .
Find the area bounded by the parabola y=x and y^(2)=x
Find the area bounded by the curve y=2x-x^(2) and the straight line y=-x
Find the area bounded by the curves y=2x-x^(2) and the straight line y=-x
Find the area enclosed by the parabola y = 2 - x^(2) and the straight line x + y = 0
Find the area bounded by the parabola y=x^(2) and the line y-2x=2 .
The area of the region bounded by the parabola y=x^(2)-4x+5 and the straight line y=x+1 is
