Given tan θ = 7 24 , use the Pythagorean Theorem to find the value of sin θ. A) sin θ = 24 25 B) sin θ = 25 7 C) sin θ = 7 25 D) sin θ = 7 24
Answers
Answer:
the correct ans for ur QUESTION is option c 7/25
Step-by-step explanation:
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Step-by-step explanation:
We have,
sin A = 2/3 ……..….. (1)
As we know, by sin definition;
sin A = Perpendicular/ Hypotenuse = 2/3 ….(2)
By comparing eq. (1) and (2), we have
Opposite side = 2 and Hypotenuse = 3
Now, on using Pythagoras theorem in Δ ABC
AC2 = AB2 + BC2
Putting the values of perpendicular side (BC) and hypotenuse (AC) and for the base side as (AB), we get
⇒ 32 = AB2 + 22
AB2 = 32 – 22
AB2 = 9 – 4
AB2 = 5
AB = √5
Hence, Base = √5
By definition,
cos A = Base/Hypotenuse
⇒ cos A = √5/3
Since, cosec A = 1/sin A = Hypotenuse/Perpendicular
⇒ cosec A = 3/2
And, sec A = Hypotenuse/Base
⇒ sec A = 3/√5
And, tan A = Perpendicular/Base
⇒ tan A = 2/√5
And, cot A = 1/ tan A = Base/Perpendicular
⇒ cot A = √5/2