P is the centroid of triangle DEF ,EH is perpendicular toDF.if DH=9cm,DG=7.5cm,EP=8cm and DE=FE. Find the length of FH,EH,PH and the perimeter of triangle DEF
Inna:
can you make a figure of this..... I cannot understand where is G
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Since, DE = EF
ΔDEF is an isosceles triangle.
∴ EH ⊥ DF
DH = FH = 9 cm
FH = 9 cm
Since G is midpoint of DE
2DG = DE
DE = 2×7.5 = 15cm
By Pythagoras theorem,
h² = p² + b²
DE² = EH² + DH²
EH² = 15² - 9²
EH² = 225 - 81
EH² = 144
EH = 12cm
EH = EP + PH
PH = EH - EP
PH = 12-8
PH = 4cm
Perimeter of ΔDEF = DE + EF + DF
= 15 + 15 + 18
= 48 cm
ΔDEF is an isosceles triangle.
∴ EH ⊥ DF
DH = FH = 9 cm
FH = 9 cm
Since G is midpoint of DE
2DG = DE
DE = 2×7.5 = 15cm
By Pythagoras theorem,
h² = p² + b²
DE² = EH² + DH²
EH² = 15² - 9²
EH² = 225 - 81
EH² = 144
EH = 12cm
EH = EP + PH
PH = EH - EP
PH = 12-8
PH = 4cm
Perimeter of ΔDEF = DE + EF + DF
= 15 + 15 + 18
= 48 cm
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