WebSolution The given points are A (–2, 3) and B (–3, 5). Abscissa of A = x-coordinate of A = –2 Abscissa of B = x-coordinate of B = –3 ∴ Abscissa of A – Abscissa of B = –2 – (–3) = –2 + 3 = 1 Hence, the correct answer is option (b). Suggest Corrections 11 Similar questions Q. WebIf A and B are two points having coordinates (−2,−2) and (2,−4) respectively, find the coordinates of P such that AP= 73AB. Medium Solution Verified by Toppr Given: AP= 73AB ABAP= 73 AP+BPAP = 3+43 BPAP= 43 Hence, the line joining the points A(−2,−2) and B(2,−4) is divided by P in ratio 3:4. P(x,y)=( m+nmx 2+nx 1, m+nmy 2+ny 1)

Ex 7.2, 8 - If A and B are (-2, -2) and (2, -4), find - Ex 7.2 - teachoo

Web15 jun. 2024 · the slope is : (YB - YA)/ (XB -XA) (14+3)/17) = 1 an equation is : y=ax+b a is a slope y = x +b the line F through point B (7,14) : 14 =7+b b = 7 the equation is : y =X+7 the x- intercept of F when y=0 : x+7 =0 so : x = - 7 Advertisement jadynskinner Answer: (17 , 0) (-2, 19) Advertisement Advertisement WebWelcome to Sarthaks eConnect: A unique platform where students can interact with teachers/experts/students to get solutions to their queries. Students (upto class 10+2) preparing for All Government Exams, CBSE … the climb parkinson\u0027s

If A and B are two points having coordinates ( - 2, - 2) and (2,

WebYou would average them. The Midpoint Formula does the same thing. If one X-value is at 2 and the other X-value is at 8, to find the X-value halfway between them, you add 2+8 and … WebThe coordinates of the points A, B and C are A(?2, 3), B(1, 1) and C (1, 4) . equation of line AC [y-3=((4-3)/(1+2))(x+2)] [3(y-3)=(x+2)] 3y-9=x+2 (i) slope of… WebAnswer in Brief If the coordinates of points A and B are (-2, -2) and (2, -4) respectively, find the coordinates of P such that AP = (3/7)AB, where P lies on the line segment AB. If A … the climb piano pdf