fiTSK is drawn. The equation of ST is y =1/2 x + 6 and ST cuts the x-axis at M. W(-4 ; 4) lies on ST and R lies on SK such that WR is parallel to the J-axis. WK cuts the x-axis at V and the y-axis at P(0 ; -4). KS produced cuts the x-axis at N. TSK = 0.
3.1 Calculate the gradient of WP (2)
3.2 Show that WP 
ST. (2)
3.3 If the equation of SK is given as 5y + 2x 60 = 0, calculate the coordinates of S. (4)
3,4 Calculate the length of WR. (4)
3.5 Calculate the size of 0. (5)
3.6 Let L be a point in the third quadrant such that SWRL, in that order, forms a parallelogram. Calculate the area of SWRL. (4)
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