Advertisements
Advertisements
Question
Write the following equation in ax + by + c = 0 form: y = 4
Advertisements
Solution
y = 4
∴ 0x +1y – 4 = 0 is the equation in ax + by + c = 0 form.
APPEARS IN
RELATED QUESTIONS
Line y = mx + c passes through the points A(2, 1) and B(3, 2). Determine m and c.
The vertices of a triangle are A(3, 4), B(2, 0) and C(1, 6). Find the equation of the median AD.
The vertices of a triangle are A(3, 4), B(2, 0) and C(1, 6). Find the equations of the line passing through the mid points of sides AB and BC.
Find the x and y-intercepts of the following line: `(3x)/2 + (2y)/3` = 1
Find the x and y-intercepts of the following line: 2x – 3y + 12 = 0
Write the following equation in ax + by + c = 0 form: y = 2x – 4
Write the following equation in ax + by + c = 0 form: `x/2 + y/4` = 1
Reduce the equation 6x + 3y + 8 = 0 into slope-intercept form. Hence, find its slope.
Verify that A(2, 7) is not a point on the line x + 2y + 2 = 0.
Find the X-intercept of the line x + 2y – 1 = 0
Find the equation of the line: having slope 5 and containing point A(– 1, 2).
Find the equation of the line: containing the point (2, 1) and having slope 13.
Find the equation of the line passing through the points A(–3, 0) and B(0, 4).
Find the equation of the line: having slope 5 and making intercept 5 on the X−axis.
Find the equation of the line: having an inclination 60° and making intercept 4 on the Y-axis.
The vertices of a triangle are A (1, 4), B (2, 3) and C (1, 6). Find equations of the sides
The vertices of a triangle are A (1, 4), B (2, 3) and C (1, 6). Find equations of the medians.
The vertices of a triangle are A (1, 4), B (2, 3) and C (1, 6). Find equations of altitudes of ΔABC
