Question #b5ab2

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Question #b5ab2

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Answer 1 · 2016-08-24T00:00:30

$a = 6$ $a=6$

Explanation:

Construct the point $C = (\sqrt{3}, 0)$ $C=(sqrt(3),0)$

Using the Pythagorean theorem, we have

$O A = \sqrt{O C^{2} + A C^{2}} = \sqrt{3 + 1} = 2$ $OA = sqrt(OC^2+AC^2)=sqrt(3+1) = 2$

The sine of an acute angle in a right triangle is equal to the length of the side opposite the angle divided by the length of the hypotenuse. Considering the right triangle $△ A O C$ $triangleAOC$ , then, we have

$sin (∠ A O B) = sin (∠ O A C) = \frac{A C}{O A} = \frac{1}{2}$ $sin(angleAOB) = sin(angleOAC)= (AC)/(OA) = 1/2$

As it is clear that $0 < ∠ A O B < \frac{π}{2}$ $0 < angleAOB < pi/2$ , the only possible value for $∠ A O B$ $angleAOB$ is $\frac{π}{6}$ $pi/6$ .
(There are multiple ways of finding this, including using the inverse sine function or calculating it from a special right triangle, however $sin (\frac{π}{6}) = \frac{1}{2}$ $sin(pi/6)=1/2$ is one of the common values worth memorizing from the unit circle)

Substituting this value in, we have $\frac{π}{6} = \frac{π}{a}$ $pi/6 = pi/a$ , and so $a = 6$ $a=6$

Answer 2 · 2016-08-24T05:16:22

$a = 6$ $a=6$

Explanation:

Given
$The acute angle ∠ A O B = \frac{π}{a} = θ (say)$ $"The acute angle"/_AOB=pi/a=theta ("say")$
The cartesian co-ordinate of the point A is $(\sqrt{3}, 1)$ $(sqrt3,1)$

If $O A = r \to Radius of the circle$ $OA=r->"Radius of the circle"$

$The polar coordinate of A becomes = (r, θ)$ $"The polar coordinate of A becomes"=(r,theta)$

$:.rcostheta=sqrt3 and rsintheta=1$

This relation gives

$tantheta =1/sqrt3$

Replacing $theta$ by $pi/a$ we get

$=>tan(pi/a) =tan(pi/6)$

$=>pi/a=pi/6$

$:.a=6$

Answer 3 · 2016-08-25T20:25:54

$a=6$

Explanation:

Drop a perpendicular from point $A$ down to X-axis. Let the base of this perpendicular on the X-axis be point $P$ .

From right triangle $Delta OAP$ we see that cathetus $AP=1$ (this is Y-coordinate of point $A$ ) and hypotenuse $OA=sqrt((sqrt(3))^2+1^1)=2$ (distance from origin expressed in X- and Y-coordinates).

Therefore,
$sin (/_AOP)=sin(/_AOB)=1/2$
from which $/_AOB=pi/6$ .

Since $/_AOB = pi/a$ , we conclude that $a=6$ .

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