Describe the line `3x=12`.

Describe the line x-3y=6 .

Find the equation of the straight line whose intercepts on X-axis and Y-axis are respectively twice and thrice of those by the line 3x+4y=12.

Find the equation of the circle passing through the origin and the points where the line 3x+4y=12 meets the axes of coordinates.

Plot the line 2x-3y=12 .

Draw the line 3x+4y=12 on a graph paper. From the graph paper, read the y-intercept of the line.

Find the equaiton of the circle drawn on the intercept between the axes made by the line 3x+4y=12 as a diameter.

Find the equaiton of the circle drawn on the intercept between the axes made by the line 3x+4y=12 as a diameter.

Find the intercepts made by the line 3x + y = 12 on the axes. Also find the equaitons of the straight lines which pass through origin and the trisection of the segment of the line intercepted between the axes.

Draw the graph of the equation 3x-4y =12. comment on: (i)x=0, y=3 is a solution of the equation. (ii) The abscissa i.e. the value of x can never be 100 units. (iii) Sum of intercept (parts made by straight line on the axes) on the axed is 7 units. (iv) Length of line segment between the axes is 5 units (v) Area of triangle formed by the line 3x-4y =12 and co ordinate axes.

The radius of the circle which touches the co-ordinates axes and the line 3x+4y=12 is 1 (b) 2 (c) 3 (d) 6