two poles of heights 15 m and 24 m stand on a plane ground. If the distance between their feet is 12 m , find the distance between their tops.
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Answer:
ANSWER
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2 ∴PR
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2 ∴PR 2
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2 ∴PR 2 =5
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2 ∴PR 2 =5 2
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2 ∴PR 2 =5 2 +12
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2 ∴PR 2 =5 2 +12 2
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2 ∴PR 2 =5 2 +12 2 =25+144
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2 ∴PR 2 =5 2 +12 2 =25+144PR=13 m.
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2 ∴PR 2 =5 2 +12 2 =25+144PR=13 m.Hence, the distance between their tops is 13m.
ANSWERLet RS be pole of height 10 m and PT be pole of height 15m.ST is the distance between their feet i.e. 12m.∴RQ=ST=12 m And, RS=QT=10m ....[∵□RQTS is a rectangle]Now, in △PQR,By Pythagoras theorem,PR 2 =PQ 2 +QR 2 ∴PR 2 =5 2 +12 2 =25+144PR=13 m.Hence, the distance between their tops is 13m.solution
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