In triangle PQR, S and T are mid-points of sides PR and PQ respectively,
The medians QS and RT intersect at U. Then area PQU : area PQR is
Answers
Given : In triangle PQR, S and T are mid-points of sides PR and PQ respectively,
The medians QS and RT intersect at U.
To Find : Area of ΔPQU : Area of ΔPQR
(a) 1:3
(b) 1:4
(c) 1:5
(d) 2:5
Solution:
S and T are mid-points of sides PR and PQ
QS is median ( median divide triangle in two equal area triangle )
=> Area of ΔPQS = (1/2)Area of ΔPQR
The medians QS and RT intersect at U.
Median intersect Each other in 2 : 1 ratio from Vertex to base
=> QU : US = 2 : 1
=> Area of ΔPQU = (2/(2 + 1)) Area of ΔPQS
=> Area of ΔPQU = (2/3) Area of ΔPQS
Area of ΔPQS = (1/2)Area of ΔPQR
=> Area of ΔPQU = (2/3) (1/2)Area of ΔPQR
=> Area of ΔPQU = (1/3) Area of ΔPQR
=> Area of ΔPQU / Area of ΔPQR = 1/3
=> Area of ΔPQU : Area of ΔPQR = 1 : 3
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