We have thatpoint a (2,4) and point b (10,6) we know thatab is divided into 16 equal partsstep 1 find the variation ab in the x coordinate delta x=(x2-x1)=10-> 8 unitsfind the variation ab in the y coordinate delta y=(y2-y1)=6-> 2 unitsstep 2find the coordinates point c x coordinate cx=ax+delta x*2/> cx=2+8*(2/> cx=3 y coordinate cy=ay+delta y*2/> cy=4+2*(2/> cy=4.25the coordinates of point c are (3,4.25)step 3find the coordinates point d x coordinate dx=ax+delta x*4/> dx=2+8*(4/> dx=4 y coordinate dy=ay+delta y*4/> dy=4+2*(4/> dy=4.5the coordinates of point d are (4, 4.5)step 4find the coordinates point e x coordinate ex=ax+delta x*4/> ex=2+8*(6/> ex=5 y coordinate ey=ay+delta y*4/> ey=4+2*(6/> ey=4.75the coordinates of point e are (5, 4.75)step 5find the coordinates point f x coordinate fx=ax+delta x*4/> fx=2+8*(8/> fx=6 y coordinate fy=ay+delta y*4/> fy=4+2*(8/> fy=5the coordinates of point f are (6,5)step 6find the coordinates point g x coordinate gx=ax+delta x*4/> gx=2+8*(10/> gx=7 y coordinate gy=ay+delta y*4/> gy=4+2*(10/> gy=5.25the coordinates of point g are (7,5.25)step 7find the coordinates point h x coordinate hx=ax+delta x*4/> hx=2+8*(12/> hx=8 y coordinate hy=ay+delta y*4/> hy=4+2*(12/> hy=5.5the coordinates of point h are (8,5.5)step 8find the coordinates point i x coordinate ix=ax+delta x*4/> ix=2+8*(14/> ix=9 y coordinate iy=ay+delta y*4/> iy=4+2*(14/> iy=5.75the coordinates of point i are (9,5.75)see the attached figure