Given, equation:
9x2+4y2=72Differentiate w.r.t
x, we get
18x+8y⋅=0⇒==Slope of tangent at point
(2,3) is
mt===So, equation of tangent using point-slope form is
(y−3)=−(x−2)⇒2y−6=−3x+6⇒3x+2y=12Now, slope of normal,
mn==Now, slope of normal,
mn==So, equation of normal is
(y−3)=(x−2)⇒3y−9=2x−4⇒2x−3y=−5Now, for the
x-intercept of the tangent line, put
y=0, then
3x+2(0)=12⇒x=4 so (4,0)For the
x-intercept of the normal line, put
y=0, then
2x−3(0)=−5⇒x=−, so, (,0)Now, base of triangle
= Distance
b∕wx-intercepts of the tangent and normal lines
b=4−()=And, height of triangles is the
y-coordinate of the point
(2,3) is
h=3So, area
=bh=()×3=∴ Area = sq. units
