Please Help!
a) A vertical tower CD of height 15 metres stands with its base C on horizontal ground. A is a point on the ground due South of C such that the angle of elevation of the top D of the tower from A is (π/4) radians. B is a variable point on the ground due East of C such that the angle of elevation of the top D of the tower from B is α radians, where 0<α<(π/2). The value of α is increasing at a constant rate of 0.01 radians per second.
i) Show that AB = 15cosecα.
ii) Find the rate at which the length AB is changing when α = (π/3)
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My failed attempt:
AC = 15 cos (π/4) = 15/√2
BC = 15 cos α
AB = √(AC^2 + BC^2)
= √[(15/√2)^2 + (15 cos α)^2]
= √[(225/2) + 225(cos α)^2]
= √225√(1/2 + (cos α)^2)
= 15√(1/2 + (cos α)^2)
how to get 15cosecα!!!!?? :mad1:
i think its got something to do with mixing up radians and degrees... i dont know.
please help if you can.
Thanks in Advance!
a) A vertical tower CD of height 15 metres stands with its base C on horizontal ground. A is a point on the ground due South of C such that the angle of elevation of the top D of the tower from A is (π/4) radians. B is a variable point on the ground due East of C such that the angle of elevation of the top D of the tower from B is α radians, where 0<α<(π/2). The value of α is increasing at a constant rate of 0.01 radians per second.
i) Show that AB = 15cosecα.
ii) Find the rate at which the length AB is changing when α = (π/3)
____________________________________________________
My failed attempt:
AC = 15 cos (π/4) = 15/√2
BC = 15 cos α
AB = √(AC^2 + BC^2)
= √[(15/√2)^2 + (15 cos α)^2]
= √[(225/2) + 225(cos α)^2]
= √225√(1/2 + (cos α)^2)
= 15√(1/2 + (cos α)^2)
how to get 15cosecα!!!!?? :mad1:
i think its got something to do with mixing up radians and degrees... i dont know.
please help if you can.
Thanks in Advance!
