The area of the closed figure bounded by...

The area of the closed figure bounded by `y=(x^2)/2-2x+2` and the tangents to it at `(1,1/2)a n d(4,2)` is `9/8s qdotu n i t s` (b) `3/8s qdotu n i t s` `3/2s qdotu n i t s` (d) `9/4s qdotu n i t s`

`9//8` sq. units

`3//8` sq. units

`3//2` sq. units

`9//4` sq. units

Text Solution

Verified by Experts

The correct Answer is:

`y=(x^(2))/(2)-2x+2=((x-2)^(2))/(2),`
`(dy)/(dx)=x-2, ((dy)/(dx))_(x=1)=-1, ((dy)/(dx))_(x=4)=2`
Thus, tangent at `(1,1//2)" is "y-1//2=-1(x-1)or 2x+2y-3=0`
Tangent at `(4,2)" is "y-2=2(x-4)or 2x-y-6=0`

`"Hence, "A=overset(5//2)underset(1)int((x^(2))/(2)-2x+2-(3-2x)/(2))dx+overset(4)underset(5//2)int((x^(2))/(2)-2x+2-(2x-6))dx`
`=overset(4)underset(1)int((x^(2))/(2)-2x+2)dx-overset(5//2)underset(1)int((3-2x)/(2))dx-overset(4)underset(5//2)int(2x-6)dx`
`=((x^(3))/(6)-x^(2)+2x)_(1)^(4)-(1)/(2)(3x-x^(2))_(1)^(5//2)-(x^(2)-6x)_(5//2)^(4)`
`=((63)/(3)-15+6)-(1)/(2)(3xx(3)/(2)-((25)/(4)-1))-((16-(25)/(4))-6(4-(5)/(2)))`
`=(3)/(2)-(1)/(2)((9)/(2)-(21)/(4))-((39)/(4)-6((3)/(2)))`
`=(9)/(8)` sq. units

Topper's Solved these Questions

AREA
CENGAGE|Exercise Exercise (Multiple)|10 Videos
AREA
CENGAGE|Exercise Exercise (Comprehension)|21 Videos
AREA
CENGAGE|Exercise Exercise 9.3|7 Videos
APPLICATIONS OF DERIVATIVES
CENGAGE|Exercise Subjective Type|2 Videos
AREA UNDER CURVES
CENGAGE|Exercise Question Bank|10 Videos

Similar Questions

Explore conceptually related problems

The area bounded by the two branches of curve (y-x)^2=x^3 and the straight line x=1 is 1/5s qdotu n i t s (b) 3/5s qdotu n i t s 4/5s qdotu n i t s (d) 8/4s qdotu n i t s

The area bounded by the curves y=(log)_e xa n dy=((log)_e x)^2 is e-2s qdotu n i t s (b) 3-es qdotu n i t s es qdotu n i t s (d) e-1s qdotu n i t s

Area bounded by the curve x y^2=a^2(a-x) and the y-axis is (pia^2)/2s qdotu n i t s (b) pia^2s qdotu n i t s (c) 3pia^2s qdotu n i t s (d) None of these

The area bounded by the curves y=x e^x ,y=x e^(-x) and the line x=1 is 2/e s qdotu n i t s (b) 1-2/e s qdotu n i t s 1/e s qdotu n i t s (d) 1-1/e s qdotu n i t s

Consider two curves C_1: y^2=4[sqrt(y)]x a n dC_2: x^2=4[sqrt(x)]y , where [.] denotes the greatest integer function. Then the area of region enclosed by these two curves within the square formed by the lines x=1,y=1,x=4,y=4 is 8/3s qdotu n i t s (b) (10)/3s qdotu n i t s (11)/3s qdotu n i t s (d) (11)/4s qdotu n i t s

The area of the triangle formed by the positive x- axis and the normal and tangent to the circle x^2+y^2=4 at (1,sqrt(3)) is (a) 2sqrt(3)s qdotu n i t s (b) 3sqrt(2)s qdotu n i t s (c) sqrt(6)s qdotu n i t s (d) none of these

A straight line passing through P(3,1) meets the coordinate axes at Aa n dB . It is given that the distance of this straight line from the origin O is maximum. The area of triangle O A B is equal to (50)/3s qdotu n i t s (b) (25)/3s qdotu n i t s (20)/3s qdotu n i t s (d) (100)/3s qdotu n i t s

The area of the region whose boundaries are defined by the curves y=2cosx , y=3tanx ,a n dt h ey-a xi si s 1+31n(2/(sqrt(3)))s qdotu n i t s 1+3/2 1n3-31n2s qdotu n i t s 1+3/2 1n3-1n2s qdotu n i t s 1n3-1n2s qdotu n i t s

The straight lines 7x-2y+10=0 and 7x+2y-10=0 form an isosceles triangle with the line y=2. The area of this triangle is equal to (a) (15)/7s qdotu n i t s (b) (10)/7s qdotu n i t s (c) (18)/7s qdotu n i t s (d) none of these

If the extremities of the base of an isosceles triangle are the points (2a ,0) and (0, a), and the equation of one of the side is x=2a , then the area of the triangle is (a) 5a^2s qdotu n i t s (b) (5a^2)/2s qdotu n i t s (c) (25 a^2)/2s qdotu n i t s (d) none of these

CENGAGE-AREA-Exercise (Single)

If A(n) is the area bounded by y=x and y=x^(n), n in N, then A(2).A(3)...
Text Solution
|
The area of the region is 1st quadrant bounded by the y-axis, y=(x)/(4...
Text Solution
|
The area of the closed figure bounded by y=(x^2)/2-2x+2 and the tangen...
Text Solution
|
The area of the region bounded by x^(2)+y^(2)-2x-3=0 and y=|x|+1 is
Text Solution
|
The area enclosed by the curve y=sqrt(4-x^2),ygeqsqrt(2)sin((xpi)/(2sq...
Text Solution
|
The area bounded by the curve y^(2)=1-x and the lines y=(|x|)/(x),x=-...
Text Solution
|
The area bounded by the curves y=(log)e xa n dy=((log)e x)^2 is e-2s q...
Text Solution
|
The area bounded by y = 3-|3-x| and y=6/(|x+1|) is
Text Solution
|
Find the area enclosed between the curves: y = loge (x + e) , x = loge...
Text Solution
|
Find the area enclosed the curve y=sin x and the X-axis between x=0 an...
Text Solution
|
The area bounded by y=x^(2),y=[x+1], 0 le x le 2 and the y-axis is whe...
Text Solution
|
The area of the region bounded by the parabola (y-2)^(2) = x- 1, the t...
Text Solution
|
The area bounded by the curves y=x e^x ,y=x e^(-x) and the line x=1 is...
Text Solution
|
The area of the region whose boundaries are defined by the curves y=2c...
Text Solution
|
Area bounded by y=sec^-1x,y=cot^-1x and line x=1 is given by
Text Solution
|
The area bounded by the curve y=3/|x| and y+|2-x|=2 is
Text Solution
|
The area enclosed by y=x^(2)+ cos x" and its normal at "x=(pi)/(2) in ...
Text Solution
|
"Given "f(x)=int(0)^(x)e^(t)(log(e)sec t- sec^(2)t)dt, g(x)=-2e^(x) ta...
Text Solution
|
Area bounded by the curve x y^2=a^2(a-x) and the y-axis is (pia^2)/2s ...
Text Solution
|
Aea of the region nclosed between the curves x=y^2-1 and x=|y|sqrt(1-y...
Text Solution
|