Question

How do you find the area of a triangle bounded by the y axis, the line f(x) = 7 - 4/5 x, and the line perpendicular to f(x) that passes through the origin?

Answer 1

Area of the triangle is `11.95` sq.unit

Explanation:

`f(x)=y= 7- 4/5 x` , slope is `m=-4/5`

Slope of perpendicular line is `m_p= -1/(-4/5)=5/4`

Equation of perpendicular line passing through origin is

`y=5/4 x` , intersecting point between the lines is

`5/4 x= 7- 4/5 x or 25 x= 140- 16 x or 41 x = 140`

`:. x = 140/41 , y= 5/4*140/41=175/41`

y intercept of line is `y= 7- 4/5 x ; y= 7` , so the triangle is

bounded by the points `(0,0) ,(0,7) and (140/41,175/41)`

Area of the triangle is `A_t=1/2*7*140/41=490/41~~ 11.95`

Area of the triangle is `11.95` sq.unit [Ans]