8. Find the equation of the line
which
passes through the point (-3,8)
and cuts off positive intercepts on
the axis whose sum is 7.
Answers
Answer:
The equation of the line with intercepts a and b is \[\frac{x}{a} + \frac{y}{b} = 1\]. The line passes through (−3, 8).
Step-by-step explanation:
:)
Answer:
4x+3y-12=0
Step-by-step explanation:
Given sum of intercepts at the axes is 7.
i.e., a+b=7
or b=7-a
Also let the point of contact of the line on the y-axis be A, and on the x-axis be B.
So the coordinates of A and B are A=(0,b) B=(a,0)
Since b=7-a, A=(0,7-a),B=(a,0)
Now we have two points to find the equation of the line AB.
We know that the equation of a line joining two points (x1, y1) & (x2, y2) is given by
(y-y1)/(y2-y1 )=(x-x1)/(x2-x1 )
So, equation of AB with points (0,7-a) & (a,0) is given by
(y-(7-a))/(0-(7-a))=(x-0)/(a-0)
(y-7+a)/(-7+a)=x/a
a(y-7+a)=x(-7+a)
ya-7a+a^2=-7x+ax
Let this be equation 1.
Since the line passes through the point (-3,8), it should satisfy equation 1
Substituting (-3,8) in equation 1 we get
ya-7a+a^2=-7x+ax
8a-7a+a^2=-7(-3)+a(-3)
a+a^2=21-3a
4a+a^2-21=0
a^2+4a-21=0
This is a quadratic in a Solving the quadratic equation we get
a^2+7a-3a-21=0
a(a+7)-3(a+7)=0
(a+7)(a-3)=0
a=-7 or a=3
a≠-7 as the line cuts the positive intercept, so a=3
Put a=3 in equation 1
ya-7a+a^2=-7x+ax
y(3)-7(3)+3^2=-7x+(3)x
3y-21+9=-7x+3x
3y-12=-4x
4x+3y-12=0
Therefore, the equation is 4x+3y-12=0