in ∆PQR, angle PQR =90° .QS perpendicular to PR and ST perpendicular to QR. if PQ =6 cm and PS =3 cm, find the area∆QST/area∆RST About the author Remi
Answer: Final Answer : 1/3 Steps and Understanding : 1) In PQS, cos (P) = PS/PQ => cos(P) = 3/6 = 1/2 => P = 60° 2) Now, finding other angles as shown in pic by using properties of triangle. 3) In PQS, tan(60°) = QS/PS => QS = 3* tan(60°) = 3√3cm In QST, sin(60°) = ST/QS => ST =( 3√3) * (√3/2 ) => ST = 9/2 cm. cos(60°) = QT/QS => 1/2 = QT/QS => QT = 3√3 * (1/2) => QT = 3√3/2 cm 4) In RST, tan(30°) = ST/TR => 1/√3 = (9/2)/ TR => TR = 9√3/2 cm. 5) Now, Finally area ( QST) / area (RST) = ( 1/2 * QT* ST )/( 1/2 * RT* ST) =QT/RT (3√3/2)/(3√3/2) =1/3 Hope this will help you Plz mark this answer as brainliest Reply
Answer:
Final Answer : 1/3
Steps and Understanding :
1) In PQS,
cos (P) = PS/PQ
=> cos(P) = 3/6 = 1/2
=> P = 60°
2) Now, finding other angles as shown in pic by using properties of triangle.
3) In PQS,
tan(60°) = QS/PS
=> QS = 3* tan(60°) = 3√3cm
In QST,
sin(60°) = ST/QS
=> ST =( 3√3) * (√3/2 )
=> ST = 9/2 cm.
cos(60°) = QT/QS
=> 1/2 = QT/QS
=> QT = 3√3 * (1/2)
=> QT = 3√3/2 cm
4) In RST,
tan(30°) = ST/TR
=> 1/√3 = (9/2)/ TR
=> TR = 9√3/2 cm.
5) Now, Finally
area ( QST) / area (RST) =
( 1/2 * QT* ST )/( 1/2 * RT* ST)
=QT/RT
(3√3/2)/(3√3/2)
=1/3
Hope this will help you
Plz mark this answer as brainliest
here is your answer Hope you like
Have a great day keep smiling
happy holi
pglubestiehere❤