CAPS · Grade 12 · Paper 2 · C
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 39°. BÂC=59∘C=59^\circC=59∘, BĈA=48∘A=48^\circA=48∘ and AC=25,7mAC=25{,}7mAC=25,7m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 39°. BÂC=68∘C=68^\circC=68∘, BĈA=58∘A=58^\circA=58∘ and AC=49,9mAC=49{,}9mAC=49,9m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 25°. BÂC=62∘C=62^\circC=62∘, BĈA=44∘A=44^\circA=44∘ and AC=34,3mAC=34{,}3mAC=34,3m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 29°. BÂC=52∘C=52^\circC=52∘, BĈA=52∘A=52^\circA=52∘ and AC=55,1mAC=55{,}1mAC=55,1m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 35°. BÂC=50∘C=50^\circC=50∘, BĈA=51∘A=51^\circA=51∘ and AC=40,2mAC=40{,}2mAC=40,2m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 31°. BÂC=54∘C=54^\circC=54∘, BĈA=58∘A=58^\circA=58∘ and AC=59mAC=59mAC=59m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 30°. BÂC=48∘C=48^\circC=48∘, BĈA=50∘A=50^\circA=50∘ and AC=35,1mAC=35{,}1mAC=35,1m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 48°. BÂC=42∘C=42^\circC=42∘, BĈA=62∘A=62^\circA=62∘ and AC=49,9mAC=49{,}9mAC=49,9m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 45°. BÂC=44∘C=44^\circC=44∘, BĈA=53∘A=53^\circA=53∘ and AC=35,7mAC=35{,}7mAC=35,7m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 45°. BÂC=64∘C=64^\circC=64∘, BĈA=53∘A=53^\circA=53∘ and AC=38,4mAC=38{,}4mAC=38,4m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 46°. BÂC=66∘C=66^\circC=66∘, BĈA=59∘A=59^\circA=59∘ and AC=35,4mAC=35{,}4mAC=35,4m. Calculate the height TB of the tower, correct to two decimal places.
B, A and C are three points in the same horizontal plane, and TB is a vertical tower. The angle of elevation of T from A is 43°. BÂC=58∘C=58^\circC=58∘, BĈA=62∘A=62^\circA=62∘ and AC=45,8mAC=45{,}8mAC=45,8m. Calculate the height TB of the tower, correct to two decimal places.