Advertisements
Advertisements
Question
Ratio of the area of ∆WXY to the area of ∆WZY is 3:4 in the given figure. If the area of ∆WXZ is 56 cm2 and WY = 8 cm, find the lengths of XY and YZ.
Solution
Given, area of ∆WXZ = 56 cm2
⇒ `1/2` × WY × XZ = 56 ......[∵ area of triangle = `1/2` × base × height]
⇒ `1/2` × 8 × XZ = 56 ......[∵ WY = 8 cm, given]
⇒ XZ = 14 cm
∴ Area of ∆WXY : Area of ∆WZY = 3:4
⇒ `"Area of ∆WXY"/"Area of ∆WZY" = 3/4`
⇒ `(1/2 xx WY xx XY)/(1/2 xx YZ xx WY) = 3/4`
⇒ `"XY"/"YZ" = 3/4`
⇒ `"XY"/("XZ" - "XY") = 3/4` ......[∵ YZ = XZ – XY]
⇒ `"XY"/(14 - "XY") = 3/4` ......[By cross-multiplication]
⇒ 4XY = 42 – 3XY
⇒ 7XY = 42
⇒ XY = 6 cm
So, YZ = XZ – XY = 14 – 6
YZ = 8 cm
Hence, XY = 6 cm and YZ = 8 cm.
APPEARS IN
RELATED QUESTIONS
Find the area of the triangle whose vertices are: (–5, –1), (3, –5), (5, 2)
Show that the following sets of points are collinear.
(2, 5), (4, 6) and (8, 8)
The point A divides the join of P (−5, 1) and Q(3, 5) in the ratio k:1. Find the two values of k for which the area of ΔABC where B is (1, 5) and C(7, −2) is equal to 2 units.
Find a relation between x and y, if the points A(2, 1), B(x, y) and C(7,5) are collinear.
Find a relation between x and y, if the points A(x, y), B(-5, 7) and C(-4, 5) are collinear.
Find the value(s) of k so that the quadratic equation x2 − 4kx + k = 0 has equal roots.
Show that the points (a + 5, a – 4), (a – 2, a + 3) and (a, a) do not lie on a straight line for any value of a.
Let `Delta = abs (("x", "y", "z"),("x"^2, "y"^2, "z"^2),("x"^3, "y"^3, "z"^3)),` then the value of `Delta` is ____________.
The points A(2, 9), B(a, 5) and C(5, 5) are the vertices of a triangle ABC right angled at B. Find the values of a and hence the area of ∆ABC.
Find the values of k if the points A(k + 1, 2k), B(3k, 2k + 3) and C(5k – 1, 5k) are collinear.
