`theta_1 and theta_2` are the inclination of lines `L_1 and L_2` with the x-axis. If `L_1 and L_2` pass through `P(x,y)`, then the equation of one of the angle bisector of these lines is

theta_1 and theta_2 are the inclination of lines L_1 and L_2 with the x-axis. If L_1 and L_2 pass through P(x_1,y_1) , then the equation of one of the angle bisector of these lines is

theta_1 and theta_2 are the inclination of lines L_1 and L_2 with the x-axis. If L_1 and L_2 pass through P(x_1,y_1) , then the equation of one of the angle bisector of these lines is

theta_1 and theta_2 are the inclination of lines L_1a n dL_2 with the x-axis. If L_1a n dL_2 pass through P(x_1,y_1) , then the equation of one of the angle bisector of these lines is (a) (x-x_1)/(cos((theta_1-theta_2)/2))=(y-y_1)/(sin((theta_1-theta_2)/2)) (b)(x-x_1)/(-sin((theta_1-theta_2)/2))=(y-y_1)/(cos((theta_1-theta_2)/2)) (c)(x-x_1)/(sin((theta_1-theta_2)/2))=(y-y_1)/(cos((theta_1-theta_2)/2)) (d)(x-x_1)/(-sin((theta_1-theta_2)/2))=(y-y_1)/(cos((theta_1-theta_2)/2))

theta_1 and theta_2 are the inclination of lines L_1a n dL_2 with the x-axis. If L_1a n dL_2 pass through P(x_1,y_1) , then the equation of one of the angle bisector of these lines is (a) (x-x_1)/(cos((theta_1+theta_2)/2))=(y-y_1)/(sin((theta_1+theta_2)/2)) (b) (x-x_1)/(-sin((theta_1+theta_2)/2))=(y-y_1)/(cos((theta_1+theta_2)/2)) (c) (x-x_1)/(sin((theta_1+theta_2)/2))=(y-y_1)/(cos((theta_1+theta_2)/2)) (d) (x-x_1)/(-sin((theta_1+theta_2)/2))=(y-y_1)/(cos((theta_1+theta_2)/2))

theta_1 and theta_2 are the inclination of lines L_1a n dL_2 with the x-axis. If L_1a n dL_2 pass through P(x_1,y_1) , then the equation of one of the angle bisector of these lines is (a) (x-x_1)/(cos((theta_1-theta_2)/2))=(y-y_1)/(sin((theta_1-theta_2)/2)) (b) (x-x_1)/(-sin((theta_1-theta_2)/2))=(y-y_1)/(cos((theta_1-theta_2)/2)) (c) (x-x_1)/(sin((theta_1-theta_2)/2))=(y-y_1)/(cos((theta_1-theta_2)/2)) (d) (x-x_1)/(-sin((theta_1-theta_2)/2))=(y-y_1)/(cos((theta_1-theta_2)/2))

The equations of bisectors of two lines L_1 & L_2 are 2x-16y-5=0 and 64x+ 8y+35=0 . lf the line L_1 passes through (-11, 4) , the equation of acute angle bisector of L_1 & L_2 is:

The equations of bisectors of two lines L_1 & L_2 are 2x-16y-5=0 and 64x+ 8y+35=0 . lf the line L_1 passes through (-11, 4) , the equation of acute angle bisector of L_1 & L_2 is:

The equations of bisectors of two lines L_1 & L_2 are 2x-16y-5=0 and 64x+ 8y+35=0 . lf the line L_1 passes through (-11, 4) , the equation of acute angle bisector of L_1 & L_2 is:

The area of triangle formed by the lines l_1 and l_2 and the x-axis is:

The equations of bisectors of two lines L_(1)&L_(2) are 2x-16y-5=0 and 64x+8y+35=0. lf the line L_(1) passes through (-11,4), the equation of acute angle bisector of L_(1)o*L_(2) is: