The area of the triangle formed by the line 5x−3y+15=0 with co ordinate axes is About the author Sadie
Answer: 15/2cm Step-by-step explanation: In order to find the area of triangle, we need all the coordinates of a triangle. Draw the graph of 5x−3y=15 on graph. Let x=0, 5(0)−3y=15 y=−5 So,the first coordinate is (0,−5) Now, let y=0, 5x−3(0)=15 x=3 So,the second coordinate is (3,0) and third one is origin (0,0). Area of a triangle = = [1/2 (x1(y2 −y3)+x2(y3 −y1 )+x3(y1 −y2 )] = 1/2(0(0−0)+(3(0−5)+0(5−0)) =15/2cm Squarer Reply
Answer:
15/2cm
Step-by-step explanation:
In order to find the area of triangle, we need all the coordinates of a triangle.
Draw the graph of 5x−3y=15 on graph.
Let x=0,
5(0)−3y=15
y=−5
So,the first coordinate is (0,−5)
Now, let y=0,
5x−3(0)=15
x=3
So,the second coordinate is (3,0) and third one is origin (0,0).
Area of a triangle =
= [1/2 (x1(y2 −y3)+x2(y3 −y1 )+x3(y1 −y2 )]
= 1/2(0(0−0)+(3(0−5)+0(5−0))
=15/2cm Squarer