Consider the equation `y - y_(1) = m(x - x_(1))`. If `m` and different lines are drawn for different values of `y_(1)`, then :

Consider the equation y - y_(1) = m(x - x_(1)) . If m is fixed and different lines ar drawn for different values of y_(1) , then :

Consider the equation y-y_(1)=m(x-x_(1)). If m and x-1 are fixed and different lines are drawn for different values of y_(1), then the lines will pass through a fixed point there will be a set of parallel lines all the lines intersect the line x=x_(1) all the lines will be parallel to the line y=x_(1)

Consider the equation y-y_1=m(x-x_1) . If m and x_1 are fixed and different lines are drawn for different values of y_1, then

Consider the equation y-y_1=m(x-x_1) . If ma n dx_1 are fixed and different lines are drawn for different values of y_1, then

Consider the equation y-y_1=m(x-x_1) . If ma n dx_1 are fixed and different lines are drawn for different values of y_1, then (a)the lines will pass through a fixed point (b)there will be a set of parallel lines (c)all the lines intersect the line x=x_1 (d)all the lines will be parallel to the line y=x_1

Consider the equation y-y_1=m(x-x_1) . If ma n dx_1 are fixed and different lines are drawn for different values of y_1, then (a) the lines will pass through a fixed point (b) there will be a set of parallel lines (c) all the lines intersect the line x=x_1 (d)all the lines will be parallel to the line y=x_1

Consider the equation y-y_1=m(x-x_1) . If ma n dx_1 are fixed and different lines are drawn for different values of y_1, then (a) the lines will pass through a fixed point (b) there will be a set of parallel lines (c) all the lines intersect the line x=x_1 (d)all the lines will be parallel to the line y=x_1

Consider the differential equation ydx-(x+y^(2))dy=0 . If for y=1, x takes value 1, then value of x when y = 4, is