Webb19 aug. 2024 · AB/AR = 4/3. Substracting 1 both sides, we get (AB - AR)/AR = (4 - 3)/3 BR/AR = 1/3. i.e R divide AB internally in 3:1. Coordinate of R is. so R( -1 , 9/2) Ans. Mark … Webb12 aug. 2024 · Points of trisection of line segment AB are given by ∴ Given statement is true. Question 7. Show that ∆ABC, where A (-2, 0), B (2, 0), C (0, 2) and APQR where P (-4, 0), Q (4, 0), R (0,4) are similar triangles. OR Show that ∆ABC with vertices A (-2, 0), B (0, 2) and C (2, 0) is similar to ∆DEF with vertices D (-4, 0), F (4,0) and E (0, 4).
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WebbIf P is a point lying on the line segment joining the points A and B such that AP: BP = m: n. Then, we say that the point P divides the line segment AB internally in the ratio m: n. Coordinates of a point which divides the line segment joining the points (x 1, y 1) and (x … WebbIn the given figure, AB is a diameter of the circle with centre ‘O’. If ∠COB = 55⁰ then the value of x is: 27.5° 55° 110° 125° VIEW SOLUTION [1] 1.iii If a rectangular sheet having dimensions 22 cm x 11 cm is rolled along its shorter side to form a cylinder. Then the curved surface area of the cylinder so formed is: 968 cm 2 424 cm 2 121 cm 2 spectrocloud_cluster_eks
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WebbFind the point which divides AB internally in the ratio: 1:3 3:1 Solution: Let C =(xC, yC), D = (xD, yD) C = ( x C, y C), D = ( x D, y D) be the points which divide AB internally in the ratio … WebbTranscribed Image Text: In an equilateral triangle ABC, a line segment is drawn from each vertex to a point on the opposite side so that the segment divides the side in the ratio 1:2, creating another equilateral triangle DEF (see below). A E B D (a) What is the ratio of the areas of the two equilateral triangles? To answer this question, (i) create the above … Webb11 maj 2024 · The line segment AB with endpoints and is divided by a point X in the ratio 1:2. To verify that X divides the line segment in the ratio 1:2, we will use section formula. … spectrochemical series and wavelength