MCQ Questions for Class 9 Maths Circles Quiz 2

A square is inscribed in the circle $${ x }^{ 2 }+{ y }^{ 2 }-6x+8y-103=0$$ with its sides parallel to the coordinate axes . Then the distance of the vertex of this square which is nearest to the origin is :

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6
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$$\sqrt { 137 } $$
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$$\sqrt { 41 } $$
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13

In the give figure, ABCD is a cyclic quadrilateral, $$
\angle C B Q=48^{\circ}
$$ and a=2b. Then, b is equal to

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$$

48^{\circ}

$$
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$$

38^{\circ}

$$
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$$

28^{\circ}

$$
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none of these

The value of x and y in tyhe fighure are measure of angles,then x+y is equal to

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$$
90^{\circ}
$$
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$$
85^{\circ}
$$
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$$
75^{\circ}
$$
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$$
65^{\circ}
$$

Distance between chords of contact of the tangents of the circle $$ x ^ { 2 } + y ^ { 2 } + 2 y x + 27 y + c = 0 $$ from the origin and the point ($$g, f$$) is

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$$ \sqrt { g ^ { 2 } + f ^ { 2 } } $$
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$$ \frac { \sqrt { g ^ { 2 } + f ^ { 2 } - c } } { 2 } $$
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$$ \frac { g ^ { 2 } + f ^ { 2 } - c } { 2 \sqrt { g ^ { 2 } + f ^ { 2 } } } $$
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$$ \frac { \sqrt { g ^ { 2 } + f ^ { 2 } + c } } { 2 \sqrt { g ^ { 2 } + f ^ { 2 } } } $$

$$ AB C D$$ is cyclic quadrilateral such that $$AB$$ is a diameter of the circle circumscribing it and $$\angle ADC=130^{ { \circ } },$$ then the value of $$\angle A B C$$ is:

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$$50 ^ { \circ }$$
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$$60 ^ { \circ }$$
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$$120 ^ { \circ }$$
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$$40 ^ { \circ }$$

What will be the area of the largest square that can be cut out of a circle of radius 10 cm?

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100 $${ cm }^{ 2 }$$
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200 $${ cm }^{ 2 }$$
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300 $${ cm }^{ 2 }$$
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400 $${ cm }^{ 2 }$$

$$\Box ABCD$$ is a cyclic quadrilateral, $$\angle BAD={ 75 }^{ \circ },m\angle ADC={ 85 }^{ \circ }$$. The bisectors of $$\angle ABC$$ and $$\angle BCD$$ meet in the point O. Find m$$\angle BOC.$$

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$${ 40 }^{ \circ }$$
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$${ 70 }^{ \circ }$$
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$${ 80 }^{ \circ }$$
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$${ 60 }^{ \circ }$$

A,B,C and D be the angles of cyclic quadrilateral taken order , then $$cos({ 180 }^{ \circ }+A)$$ + $$cos({ 180 }^{ \circ }+B)$$+$$cos({ 180 }^{ \circ }+C)$$+$$cos({ 180 }^{ \circ }+D)$$is equal to

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2 (cosA+cosB )
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2 (cosA+cosD)
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0
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4 cos A

Consider a circle with center O and radius = 20cm. Find the perpendicular distance of a chord of length 32cm from the center of the circle.

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20cm
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18cm
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14cm
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12cm

Write True or False and justify your answer in each of the following :
If $$A , B , C$$ and $$D$$ are four points such that $$ \angle BAC$$ $$ =45^{\circ} $$ and $$ \angle $$ BDC = $$ 45^{\circ} $$ , then $$A , B , C , D $$ are concyclic.

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True
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False

Write True or False and justify your answer in each of the following :
If $$A , B , C , D$$ are four points such that $$ \angle BAC$$ $$= 30^{\circ} $$ and $$ \angle $$ BDC = $$ 60^{\circ} $$, then $$D$$ is the center of the circle through $$A , B$$ and $$C$$.

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True
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False

Consider a circle with center O and radius = 25cm. Find the perpendicular distance of a chord of length 14cm from the center of the circle.

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$$20cm$$
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$$24cm$$
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$$18cm$$
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$$14cm$$

Consider a chord $$AB = 10cm$$, of a circle with radius $$r$$. A line segment $$OM = 3cm$$ from the center O of the circle to AB, bisects AB into two equal parts.
Then what is the value of $$r$$?

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$$\sqrt {40}$$
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$$\sqrt {35}$$
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$$\sqrt {34}$$
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$$\sqrt {50}$$

Consider a chord $$AB = 24cm$$, of a circle with radius $$r$$. A line segment $$OM = 5cm$$ from the center O of the circle to AB, bisects AB into two equal parts.
Then what is the value of $$r$$?

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$$13 cm$$
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$$24 \sqrt 2cm$$
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$$20cm$$
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$$ 19 cm$$

Consider a circle with center O and radius = 13cm. Find the perpendicular distance of a chord of length 10cm from the center of the circle.

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8cm
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10cm
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12cm
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15cm

Consider a chord $$AB = 8cm$$, of a circle with radius $$r$$. A line segment $$OM = 3cm$$ from the center O of the circle to AB, bisects AB into two equal parts.
Then what is the value of $$r$$?

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$$3 \sqrt 2cm$$
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$$\sqrt 71cm$$
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$$5cm$$
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$$4 \sqrt 2cm$$

To prove "The line drawn through the centre of a circle to bisect a chord is perpendicular to the chord", we prove congruence of which two triangles?

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$$\triangle AOM \ and \ \triangle BOM$$
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$$\triangle AOM \ and \ \triangle BOA$$
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$$\triangle AOB \ and \ \triangle BOM$$
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$$\triangle AOM \ and \ \triangle MOB$$

How many circles pass through 3 non-colinear given points?

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1
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2
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More than 2
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Infinitely many

In given figure, is possible to draw another circle using points $$X, Y$$ and $$Z$$ which will be different from given circle?

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Yes
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No
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Can't say anything
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None of these

How many circles can be drawn using given three collinear points?

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0
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1
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4
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Infinitely

If three points are collinear, then we can draw a circle using given points.

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True
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False
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May be
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None of these

In the given image, in which of figure, we can draw another circle using the vertices of triangle different from already existing circle?

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Figure 1
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Figure 2
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Figure 3
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Not possible in any of the figure

Which of the following pair of angles are opposite angles of a cyclic quadrilateral?

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$$131^{\circ}, 28^{\circ}$$
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$$95^{\circ}, 55^{\circ}$$
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$$123^{\circ}, 57^{\circ}$$
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$$64^{\circ}, 52^{\circ}$$

In Fig 10.9 $$\displaystyle \angle AOB= 90^{\circ}\,and\,\angle ABC=30^{\circ}\,then\,\angle CAO$$ is equal to

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$$\displaystyle 30^{\circ}$$
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$$\displaystyle 45^{\circ}$$
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$$\displaystyle 90^{\circ}$$
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$$\displaystyle 60^{\circ}$$

In the given figure $$O$$ is the centre of the circle and $$\displaystyle \angle AOC=120^{\circ}$$. What is the value of $$\displaystyle \angle APC+\angle ABC$$?