Question #6de4a

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Question #6de4a

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Answer 1 · 2016-07-23T13:57:33

The locus of all such points is a circle of radius $\sqrt{2}$ $sqrt(2)$ with a center at origin. The equation describing this circle is
(3) $x^{2} + y^{2} = 2$ $x^2+y^2 = 2$

Explanation:

The circle with equation $x^{2} + y^{2} = 4$ $x^2+y^2=4$ has a center at origin and radius $R = 2$ $R=2$ .

All chords sub-tending a right angle in this circle (as all chords sub-tending a fixed angle in any circle) have fixed length.

A triangle formed by a chord sub-tending the right angle and two radii to its ends is a right isosceles triangle with a chord as a hypotenuse and each radius as a cathetus.

Therefore, the length of any chord, sub-tending the right angle in a circle of a radius $R = 2$ $R=2$ , by Pythagorean Theorem has the length
$L = \sqrt{R^{2} + R^{2}} = 2 \sqrt{2}$ $L = sqrt(R^2+R^2) = 2sqrt(2)$

The segment from the center of a circle to a midpoint of a triangle described above is an altitude, median and right angle bisector of this right isosceles triangle. The length of this segment can also be calculated using Pythagorean Theorem as
$H = \sqrt{R^{2} - {(\frac{L}{2})}^{2}} = \sqrt{4 - {(\sqrt{2})}^{2}} = \sqrt{2}$ $H = sqrt(R^2-(L/2)^2) = sqrt(4-(sqrt(2))^2)=sqrt(2)$

This length $H$ $H$ is a distance from the origin to a midpoint of ANY chord sub-tending a right angle in our circle.

Therefore, the locus of all such points is a circle of radius $H = \sqrt{2}$ $H=sqrt(2)$ with a center at origin. The equation describing this circle is
(3) $x^{2} + y^{2} = 2$ $x^2+y^2 = 2$

Answer 2 · 2017-11-13T18:49:29

The Right Choice is Option $(3) : x^{2} + y^{2} = 2 .$ $(3) : x^2+y^2=2.$

Explanation:

Observe that, $x^{2} + y^{2} = 4$ $x^2+y^2=4$ represents a circle, having centre at the

Origin $O = O (0, 0)$ $O=O(0,0)$ and radius $r = 2 .$ $r=2.$

The parametric eqns. of this circle are,

$x = 2 cos θ, y = 2 sin θ, θ \in [0, 2 π) .$ $x=2costheta, y=2sintheta, theta in [0,2pi).$

Let $P = P (2 cos θ, 2 sin θ)$ $P=P(2costheta,2sintheta)$ be one end-point of a chord $P Q$ $PQ$

of this circle.

Then, $- - \to O P$ $vec(OP)$ makes an $∠ θ$ $/_theta$ with the $+ v e$ $+ve$ direction of

the X-axis.

Since, $P Q$ $PQ$ subtends a right angle at the Origin $O,$ $O,$ we find

that $- - \to O Q$ $vec(OQ)$ must be making an $∠ (θ \pm \frac{π}{2})$ $/_(theta+-pi/2)$ with the

$+ v e$ $+ve$ direction of the X-axis.

$:. Q=Q(2cos(theta+-pi/2),2sin(theta+-pi/2)), i.e.,$

$Q=Q(-2sintheta,2costheta), or, Q=Q(2sintheta,-2costheta).$

If $Q=Q(-2sintheta,2costheta), and, P=P(2costheta,2sintheta),$

then, the mid-point $M" of "PQ$ is $M(costheta-sintheta,costheta+sintheta).$

To find the Locus of M, let us set, $M=M(X,Y)$ , then, we have,

$X=costheta-sintheta, Y=costheta+sintheta.$

Eliminating $theta$ from this, we get, $X^2+Y^2=2,$ showing that

the general eqn. of the desired locus is $x^2+y^2=2.$

In case, $Q=Q(2sintheta,-2costheta),$ we get the same result.

Hence, the right choice is option $(3) : x^2+y^2=2.$

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