Find the equation of a straight line passing through (-8,4) and making equal intercepts on the coordinate axes About the author Mia
Αηѕωєя : Equation of a straight lines passing through (-8,4). making equal intercept on the co-ordinate axis. As we know that, Let we assume that x-intercept & y-intercept = t equation of line, ⇒ x/a + y/b = 1. We can write as, ⇒ x/t + y/t = 1. ⇒ -8/t + 4/t = 1. ⇒ -8 + 4 = t. ⇒ -4 = t. Put the value of t = -4 in equation, we get. ⇒ x/-4 + y/-4 = 1. ⇒ x + y = -4. ⇒ x + y + 4 = 0. Reply
Answer: Equation of straight line with equal intercept are given by x+y=a Now since it passes through (2,4), so a=4+2=6 Hence the line is x+y=6 Reply
Αηѕωєя :
Equation of a straight lines passing through (-8,4).
making equal intercept on the co-ordinate axis.
As we know that,
Let we assume that x-intercept & y-intercept = t
equation of line,
⇒ x/a + y/b = 1.
We can write as,
⇒ x/t + y/t = 1.
⇒ -8/t + 4/t = 1.
⇒ -8 + 4 = t.
⇒ -4 = t.
Put the value of t = -4 in equation, we get.
⇒ x/-4 + y/-4 = 1.
⇒ x + y = -4.
⇒ x + y + 4 = 0.
Answer:
Equation of straight line with equal intercept are given by x+y=a
Now since it passes through (2,4), so a=4+2=6
Hence the line is x+y=6