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Question
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Radio towers are used for transmitting a range of communication services including radio and television. The tower will either act as an antenna itself or support one or more antennas on its structure. On a similar concept, a radio station tower was built in two sections ‘A’ and ‘B’. Tower is supported by wires from a point ‘O’ (as shown in figure).
Distance between the base of the tower and point ‘O’ is 6 m. From point ‘O’, the angle of elevation of the top of the section ‘B’ is 30° and the angle of elevation of the top of section ‘A’ is 60°. |
Based on the above information, answer the following questions:
- Find the length of the wire from the point ‘O’ to the top of section ‘B’. 1
- Find the length of the wire from the point ‘O’ to the top of section ‘A’. 1
-
- Find the distance AB. 2
OR - Find the area of Δ OРВ. 2
- Find the distance AB. 2
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Solution
Given: OP = 6 m
∠ POB = 30°
∠ POA = 60°
(i) In Δ OРВ, a right-angled triangle.
∠ OPB = 90°
cos 30° = `(OP)/(OB)`
`sqrt3/2 = 6/(OB)`
`sqrt3 xx OB = 6 xx 2`
`OB = 12/sqrt3`
= `(12 xx sqrt3)/(sqrt3 xx sqrt3)`
= `(12 xx sqrt3)/3`
= `4sqrt3` m
(ii) In Δ APO, a right-angled triangle.
cos 60° = `(OP)/(OA)`
`1/2 = 6/(OA)`
OA = 6 × 2
= 12 m
(iii) (a) In Δ BPO, a right-angled triangle.
tan 30° = `(BP)/(OP)`
`\implies 1/sqrt(3) = (BP)/6`
`\implies` BP = `6/sqrt(3) xx sqrt(3)/sqrt(3)`
= `6/3 sqrt(3)`
= `2sqrt(3)` m
In Δ APO, a right-angled triangle.
tan 60 = `(AP)/(OP)`
`sqrt3 = (AP)/6`
AP = `6sqrt3`
∴ AB = AP – BP
= `6sqrt3 - 2sqrt(3)` m
= `4sqrt(3)` m
= 4 × 1.73 m
= 6.92 m
OR
(b) In ΔBPO, a right-angled triangle.
tan 30° = `(BP)/(OP)`
`\implies 1/sqrt(3) = (BP)/36`
BP = `6/sqrt(3)`
= `6/sqrt(3) xx sqrt(3)/sqrt(3)`
= `(6 sqrt(3))/3`
= `2sqrt(3)` m
Now, Area of ΔOPB = `1/2 xx "height" xx "base"`
= `1/2 xx BP xx OP`
= `1/2 xx 2sqrt(3) xx 6`
= `6 sqrt(3)`
= 6 × 1.73
= 10.38 m2
