tc | cat geometry geometry 4 - solutions the radius of the circle is. (a) x16 / 4s (b) x 2.5 (c) x 2...
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1. The sides of a triangle ABC are AB = 12, BC = 18
and AC = 10. There is a point D, on BC such that
both in-circles of triangles ABD and ACD touch
AD at a common point E, as shown below.
What is the length of CD?
Solution:
The tangents drawn from an external point are
always equal in length.
DE = DG = DF = x (say)
FC = HC = y (say)
AI = AE = AH = z (say)
BG = BI = k (say)
Now AB + BC + CA = k + z + k + z+ x + y + z + y =
2(k + x + y +z)
β 40 = 2(k + x + y + z) β x + y + z + k = 20
z + k = AB = 12 β x + y = CD = 20 β (z + k) = 20 β
12= 8
2. Two circles with radii βaβ & βbβ respectively touch
each other externally. Let βcβ be the radius of a
circle that touches these two circles as well as a
common tangent to these two circles. The a, b, c
are in
(a) GP (b) H.P
(c) 1 1 1
c a b (d)
1 1 1
c a b
Solution:
There are three DCTs and they are AB, BC and AC. The
figure also says that AB + BC = AC
AB = DCT = β(π + π)2 β (π β π)2 (formula for
DCT), a+c is the distance between the centers of two
circles and a and c are the radii of two respective
circles. Similarly write the expressions for BC and AC,
and after simplification we get, AB = 2βππ
BC = 2βππ AC = 2βππ
2βππ = 2βππ + 2βππ
Divide on either sides with βπππ
Hence, answer is Option d)
3. OPQ is a quadrant of a circle and semicircles are
drawn on OP and OQ as diameter. Then area of
shaded portion A : B equals.
(a) 1 : 2 (b) 2 : 1 (c) 3 : 2 (d) 1 : 1
Solution: Since it involves ratio, let us assume values. Take 1-1- squares. Whenever such kind of figures are given, look for a square and wen no values are given, assume the values, preferably 1.
Geometry β 4 - Solutions
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The above square can be pictured as below diagrams
The above figure is a combination of the below two diagrams.
There is a square and a quarter of a circle, so the left
over area will be 1- π
4. Thus to summarize, the figure
will now become:
1 - π
4 + A + 1 - π/4 = 1 (Area of the square)
A + 1 - π
2 = 0
A = π
2 β 1
Next,
2 quarter circles + 1 square + B = area of bigger
quarter circle. π
4 +
π
4 + B = π (Area of bigger quarter,
since its radius is 2 units)
B = π
2 β 1
Ratio of the areas = 1: 1
4. In ABC , let AB = 20, AC = 11, BC = 13. The
diameter of semicircle inscribed in ABC, (whose
diameter lies on AB and side AC & BC are
tangents o the semi-circle) is equal to
(a) 13 (b) 11
(c) 17 (d) 19
Solution:
Β½ 13 (r) + Β½ 11 (r) = βπ (π β 1)(π β π)(π β π)
24
2 r = 66
12 r = 66
d = 2r = 11
5. If cot2 π - (1 + β3) cot π + β3 = 0, then what is
the value of π?
Solution:
Let cot π = x
Then x2 β (1 + β3)π₯ + β3 = 0
β΄ x2 β x - β3x + β3 = 0
β΄ x (x β 1) - β3(x β 1) = 0
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β΄ (x β 1) (x - β3) = 0
β΄ x = 1 or x = β3
β΄ π = π
4 or π =
π
6
6. ABC is a right angled at B. if BD = 8cm, BE =
6cm, AE = 10cm & CD = 10cm. Then find the area
(in sq. cm) of (quadrilateral BDOE)
(a) 24 (b) 28
(c) 32 (d) 34
Solution:
Join O and B
In triangle AOB, there are two more triangles, AEO
and BEO, both these triangles have the same height.
Hence if you see the ratio of their areas, they will be
in the ratio of their bases.
π΄πΈπ
π΅πΈπ=
10
6=
5
3
Let AEO be 5x and BEO be 3x
Similarly,
Look at triangle BOC, there are two more triangles
BOD and COD, and both these also have the same
height.
π΅ππ·
πΆππ·=
8
10=
4
5
Let BOD be 4y and COD be 5y
Quadrilateral BDOE = BOE + BOD = 3x+4y
Now, area of triangle ABD = Β½ * 8 * 16 = 5x+3x+4y
= 64 = 8x+4y
Similarly, area of triangle BEC = Β½ * 6* 18 =
5y+4y+3x
= 54 = 9y + 3x.
Solve for x and y using the above two equations,
then find the value of 3x+4y which is the answer.
The correct answer is Option d) 34
7. If πΌ, π½, πΎ and πΏ are four angles of a cyclic
quadrilateral, then the value of
cos πΌ + cos π½ + cos πΎ + cos πΏ is:
Solution:
In a cyclic Quadrilateral , the sum of the
opposite angles is 1800. Assuming that πΌ is
opposite to πΎ, and π½ is opposite to πΏ.
πΌ + πΎ = 180
π½ + πΏ = 180
ππ πΌ = 180 β πΎ
π½ = 180 - πΏ
Hence the question becomes
cos (180 β πΎ) + cos (180 β πΏ) + cos πΎ + cos πΏ
cos (180 β πΎ) will be β cos πΎ, because this angle
will be in the second quadrant, and cos value
will be negative in second quadrant, so will cos
(180 β πΏ), as it becomes β cos πΏ, hence the
expressionβs value will be 0.
8. In the given figure, ABC is a triangle with AB = 5,
BC = 6 and CA = 7. Squares are drawn on each
side, as in the figure below. Find the area of
hexagon DEFGHI
(a) 90 + 24β3 (b) 90 + 24β6
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(c) 100 + 24β6 (d) None of these
Solution:
Carefully observe this figure, and the area of this
hexagon will be equal to area of 3 squares (ABGH,
ACDI, BCFE ) and 4 triangles (ABC, AHI, BGF, CDE).
We can find the area of the triangle ABC as the length
of the sides are given.
Area of triangle ABC is 6β6 = Β½ * AB * AC * Sin A
= Β½* 5*7 * Sin A = 6β6
Sin A = 12β6
35
We can also say, angles BAC+ HAD+ HAI+CAI = 3600
(Sum of all the angles), HAD and CAI = 900 each, thus
HAI = 180 β BAC
For triangle HAI, the area will be Β½ * HA *AI * sin (HAI),
but Sin (HAI) = Sin (180-BAC)= Sin (180-A) = Sin A
Thus Sin (HAI) = Sin A. Thus the area of triangle HAI is
Β½ * 5 * 7 * 12β6
35 = 6 β6
Use the above concept and find out the areas of all
the triangles, we can also find the areas of all the
squares, sum it up to get the answer. Answer will be
option d), none of these.
Alternate method:
We can easily find the area of the three squares and
if we do that, we will get a value which is greater than
the given options, letting us know that the answer is
option d)
9. In the figure, ABCD is a parallelogram with β CAD
= 2 β CAB. The bisector of β CAD meets CD at E. If
AD = 12 and DE = 8, find AC
(a) 12 (b) 15
(c) 16 (d) 18
Solution:
βADE ||| βABC
π΄π·
π΄π΅ =
π·πΈ
π΅πΆ =
π΄πΈ
π΄πΆ
12
π΄π΅ =
8
12 AB = 18
In ADE (Angular bisector theorem)
π·π΄
π·πΈ =
π΄πΆ
πΆπΈ
Substitute the values to get the value of AC
10. Let PQ & RS be tangents at the extremities of the
diameter PR of a circle of radius r. If PS & RQ
intersect at a point X on the circumference of the
circle, then 2r equals.
(a) .PQ RS (b) ππ+π π
2
(c) 2 (ππ.π π)
(ππ+π π) (d) 2 2
2
PQ RS
Solution:
Figure not drawn to scale:
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In βQPR,
tan 90 β π = ππ
ππ
cot π = ππ
ππ
tan π = π π
ππ
cot π x tan π = ππ
ππ x
π π
ππ
1 = ππ π₯ π π
ππ 2
PR2 = PQ x RS
PR = Diameter, which is 2r, so answer is option a)
11. A square is inscribed in a quarter of a circle in
such manner that two of its adjacent vertices lie
on the radii at an equal distance from the
centre, while the other two vertices lie on the
circular arc. If the square has side of length x,
then the radius of the circle is.
(a) 16 / 4x (b) 2.5x
(c) 2x (d) 3
2x
Solution: Figure not drawn to scale
OA = radius
OA = βπ₯2 + 2π₯2 = π₯β2.5
Answer is Option b) 12. ABC is an isosceles triangle right angled at B. A
square is inscribed inside the triangle with three
vertices of the square on three sides of the
triangles as shown in the adjacent figure. It is
known that the ratio x to y equal to 2 to 1.
The ratio of the area of the square to the area of
the triangle is equal to:
(a) 2 : 5 (b) 1 : 10
(c) 1 : 3 (d) 2 : 3
Solution: We draw a perpendicular GF from the
square on the side AB.
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β EFG and β EBD are congruent (three
angles equal and one side equal)
β EF = y and FG = x
Now FG = AF (β FAG = β AGF = 450)
β AF = x
Therefore one side of the right triangle = 2x
+ y. The other side is also equal to 2x + y β
Area of the triangle = (2π₯+π¦)2
2
Area of the square = x2 + y2
Ratio = π₯2+π¦2
(2π₯+π¦)2 = 2 : 5, Option a)
13. A quadrilateral is obtained by joining the
midpoints of the adjacent sides of the rhombus
ABCD with angle A = 60 degrees. This process of
joining midpoints of the adjacent sides is
continued infinitely. If the sum of the areas of all
the above said quadrilateral including the
rhombus ABCD is 64 3 sq. cm, what is the sum
of the perimeters of all the quadrilaterals
including the rhombus ABCD? (in cm) .
(a) 16 (5 + β3) (b) 16 (5 - β3)
(c) 16 (3 + β5) (d) 16 (2 + β3)
(e) 16 (3 - β2)
Solution:
Figure 1 In the above image, the topmost figure is the
point of concern. The outermost diagram is that of a rhombus and if we join the midpoints of this rhombus, we get a rectangle (parallelogram), joining the mid points of this rectangle, you will get another rhombus and this process continues. If A1 is the area of the outer rhombus, then the value will be a2 Sin Ο΄, where a is the side of the rhombus and Ο΄ is the angle between the two sides. Also, the rectangle formed inside the rhombus will have its area equal to half of that of the rhombus (can be proven), and the rhombus formed inside this rectangle will have its area half of that of the rectangle, which in turn means ΒΌ the area of the outer Rhombus. Area will be proportional to the length of the sides, generally the product of the sides, here the sides are of equal length, If there are two geometrical figures whose sides are in the ratio 2:1, then their areas will be in the ratio 4:1. Let the length of the side of the outer rhombus be 4a. Thus
A1 = (4a)2sin60 = 8β3 a2
Similarly, if A2 is the area of the inner rhombus, then
A2 = 8β3 (2) a2 = 4β3 a2 (half of the outer rhombus)
A3 = (2a)2 sin60 = 2β3 a2
This will be an infinite GP, thus total area = 8β3 a2 +
4β3 a2 + 2β3 a2+β¦β¦β¦β¦..so on = 64β3
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Solve for a, to get the value of a as 2.
Therefore the value of the sum of all the perimeters will be = 4(4a + 2a + a+ a/2β¦.so on)
The above expression talks about only the rhombus, but then we need to consider the rectangles that are formed inside these rhombus by joining their midpoints.
So the rectangle formed inside the first rhombus will
have sides as β3a and 2a, refer the smaller diagram in figure 1. The subsequent rectangles will have their areas equal to half of their outer counterparts.
The sum of all their perimerters will be
2(2β3a + 2a) + 2 (β3a + a)β¦. so on
Therefore the total sum will be: Perimeter = 4(4a +
2a β¦.) + 2(2β3a + 2a) + 2 (β3a + a)β¦.
= 4(4π)
1β1
2
+ 4(β3+1)π
1β1/2
=32a + 8β3 a + 8a
= 40 a + 8β3 a
= 8a(5 + β3)
= 16 (5 + β3)
Option a)
14. In the given figure, EB is parallel & equal in length
to DC, the length of ED is equal to the length of
DC, the area of triangle ADC = 8 units, the area of
triangle BDC is 3 units. And angle DAB is a right
angle. Then the area of triangle AEB is
A
B C
DE
O
(a) 3 units (b) 5 units (c) 2 units (d) 8 units (e) none of these
Solution:
βADC = Β½ (AD)h = 8 βΉ (AD)h = 16
βBDC = Β½ (BC)h = 3 βΉ (BC)h = 6 βΉ (ED)h = 6
β ABE = Β½ (AE)h = Β½ [AD β ED]h = Β½ (16 β 6) = 5
Option b)
15. A square ABCD is constructed inside a triangle
PQR having sides 10, 17 & 21 as shown in the fig.
Find the perimeter of the square ABCD.
A
D C
B
R
P
Q21
1017
Solution:
Check for the triplets, 17, 15 and 8
Draw a perpendicular from P to S on QR. PSQ is a
right angled triangle, 17 is the hypotenuse, so the
other two sides will be 15 and 8, hence QR =
QS+SR, where QS= 15 and SR = 6 so that QR = 21
PS = 8 units
Now Triangle PAB and PQR are similar, apply the
concept of similarity, write the ratios and you will
get the value of one side of the square ABCD and
thereby the perimeter, answer should be 23.2
units
16. In a triangle ABC, D, E, F & G are points taken on
the sides of the triangle such that
90BED BGC DFC . Further, AB = AC,
BG = 6cm, DF = 4cm & BE = 2cm. What is the
length in cm of BD?
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B D C
F
G
E
A
(a) 4 (b) 2β2 (c) β3 (d) β5
Solution:
βBGC ||| DFC
π΅πΊ
π·πΉ =
π΅πΆ
πΆπ· =
3
2 Let BC = 3x, CD = 2x, Hence BD will
be x
Join E & D Now
BDE ||| CFD
π΅πΈ
πΉπΆ=
πΈπ·
πΉπ·=
π΅π·
πΆπ·=
π
2π=
1
2
ED = 2
In triangle BED, E is 900, and BE = ED =2, it is a right
angled isosceles triangle, hence BD = 2β2
Option b)
17. The length (in cm) of the side of a 100 sided
convex polygon are 1, 2, 3, β¦..100. A circle of
radius r cm is inscribed in this polygon. What is
the area of the polygon?
(a) 2525r (b) 2515r
(c) 2540r (d) 2520r
Solution:
By adding the area of all the triangles youll get area of the polygon and the height of each β= π (radius of the circle) and base = length of side of the polygon.
β΄ Area of polygon = Β½ [(1)π + 2(π)β¦β¦β¦β¦100(π)]
= π(100)(101)
2π₯2
= 2525 π
18. β ABC is equilateral triangle with area A.
1 1 1PQ R is drawn such that point 1 1 1, ,P Q R
intersect the side AB, BC, & CA in the ratio 2 :1 ,
respectively. Then another 2 2 2PQ R is drawn
such that points 2 2 2P Q R intersect the side
1 1 1 1 1 1, &PQ Q R R P in the ratio 2 :1,
respectively. If the process is repeated to infinite
times, find the sum of the areas of all triangle,
such drawn (i.e.
1 1 1 2 2 2ABC PQ R PQ R ) .
(a) 2A (b) 1.5 A
(c) 3A (d) 4
3 A
Solution:
Let the side of the triangle be βaβ
AB = BC = CA = a
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Since the sides are divided in the ratio
2:1, we can write, AR1 = a/3 and R1C = 2a/3
β ABC = β3
4 a2
, let this area be A
β R1Q1C = 1
2(π
3)(
2π
3) sin600 =
π2β3
9π₯2
β P1Q1R1 = β3
4 a2 β 3 (
π2β3
9π₯2) = β3a2 (1/4
β 1/6)
= β3π2
12 = A/3 =
One third the area of the bigger triangle.
Simlarly, this follows for other triangles
β΄ β ABC + β P1Q1R1 + β P2Q2R2 β¦β¦ = A +
A/3 + A/9β¦so on
= π΄
1β1/3 =
3
2 A
19. Find the area of the shaded region in the figure,
if the side of the largest square is 4 cm & the
other squares are the largest squares that can be
drawn inside the respective quarter circle?
(a) 26.4 cm (b)
28 cm
(c) 24.4 cm (d)
212 cm
Solution:
If a circle is inscribed inside a square, ratio of area of
square to circle = 4:π
On the other hand, if a square is inscribed inside a
circle, ratio of area of square to circle = 2:π
In the figure below, area of inner square is half that
of the outer square, and this relation holds good for
the circles as well.
You now have a quarter square and circle inscribed
in it. Let us assume that we have a full square and a
circle inscribed in it.
Ao (complete squares) = 64
We know that π΄πππ ππ π πππ’πππ
π΄πππ ππ πΆπππππ =
4
π Area of
Circle = π
4 * Area of Square
Area of Circle = 16π. Therefore the area of the remaining region is 64 - 16 π. We are looking at ΒΌ of
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the total figure, hence the remaining region will be 1
4
(64 - 16 π).
In fact the subsequent figures will also have the remaining region in the same order, i.e. they will be half of their preceding diagram
64 - 16 π 1
4 (64 - 16 π).
32 - 8 π 1
4 (32 - 8 π)
16 - 4 π ΒΌ (16 - 4 π)
8β 2 π ΒΌ (8β 2 π )
The question is about sum of all the values on the
right side, which is 120β30π
4 = 6.4
Answer is Option a)
20. A regular hexagon is circumscribed by a rectangle
such that all the six corners of the hexagon lie on
the rectangle. What is the ratio of the area of the
largest possible equilateral triangle that can be
cut from the rectangle to the area of the
hexagon?
(a) 3: 2 (b) 2:3
(c) 3 :1 (d) 2: 3
Solution:
The biggest triangle you can fit within the
rectangle is one that has its base identical to one
of the sides of the rectangle and the third vertex
lies on the opposite side.
There are enough proofs available for the same.
Here the question is equilateral triangle of
maximum area, so we need to find the longer
side of the rectangle so that, it will become the
base of the triangle.
You can see from the above figure where there is
a hexagon of side βaβ units, and if a rectangle is
circumscribed, the length of the largest side will
be 2a, hence the area of this triangle will be
β3
4(2a)2. And the area of the hexagon is 6 *
β3
4(a)2
Taking their ratio we get, 2:3, option b)
21. There is a square field with three cows tethered
at three different vertices of the fields. The ropes
used to thither the cows are all of the same
length. Each of the cows can reach the other two
cows & the ropes used have the minimum
possible length. If the area of the square field is2784m , what is the area of the field that cannot
be accessed by any of the three cows?
(a) 284m (b) 2168m
(c) 2161m (d) 2322m
Solution:
A, B and C are the positions where three cows are
tethered, A and C or A and B can meet each other at
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the mid point of one of the sides of the square field.
However for B and C to meet, it can happen only at
D, the area is given as 784, hence, each side is 28,
and CD = 14 β2 units, in fact this will be the length
of the rope to which all three cows are tethered. We
need to find out the area of the required region,
which is equal to Area of the triangle β [Area of two
sectors].
Area of each sector will be Β½ * r2 * Ο΄, here Ο΄ is
the angle subtended and it is in radians. Here Ο΄ will
be 45 degrees and it is written as π
4 radians.
Find out the area of the triangle and sectors,
substitute to get the answer as 84, option a)
22. A Ball of diameter 13cm is floating so that top of
the ball is 4cm above the smooth surface of pond.
What is the circumference (in cm) of the circle
formed by the contact of water surface with the
ball?
(a) 10 (b) 11
(c) 12 (d) 24
Solution:
The above figure summarizes the situation and
the answer is 12 , option c)
23. cot-1 [β1βsin πΌ+β1+sin πΌ
β1βπ ππ πΌ ββ1+π ππ πΌ ] =
(a) 2π β a (b) π - 1
2π (c)
1
2π - 3π
(d) None of these
Solution:
1 β sin π = (cos2 π
2 + sin2
π
2)2
Similarly,
β΄ 1 + sin π = (cos π
2 - sin
π
2)2
β΄ cot-1 [β1βsin π+β1+sin π
β1βπ ππ π ββ1+π ππ π ]
= cot-1 (πππ
π
2 βsin
π
2 +cos
π
2 +π ππ
π
2
πππ π
2 βπ ππ
π
2 βπππ
π
2 βsin
π
2
)
= cot-1 (βπππ‘π
2)
= cot-1 [πππ‘ (π βπ
2)]
= π β π
2
Hence, Option b).
24. In triangle ABC, D and E are any points on AB
and AC such AD = AE. The bisector of angle C
meets DE at F. It is known that angle B = 600
What is the value of angle DFC?
Solution:
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(Figure not drawn accordingly)
β B = 600 β β A + β C = 1200
In the figure π is the external angle of βFEC
β β EFC + πΆ
2
π = 180βπ΄
2 = 90 -
π΄
2 = β EFC +
πΆ
2
β EFC = 90 β (π΄
2+
πΆ
2) = 90 β 60 = 300
25. In triangle PQR, points X, Y and Z are on PQ, PR
and QR, respectively, such that PX = XQ, π π
ππ =
π
π,
and ππ
ππ = 3. Also (area βPXY)2 = (area βQXZ) x
(area βRYZ)
The ratio of a: b is
(a) π+βπππ
π (b)
π+βππ
π
(c) π+βππ
π (d)
βπππβπ
π
Solution:
Area of a triangle = Β½ * a * b * SinΟ΄, Using that
concept, we can get
π΄πππ βπππ
π΄πππ βπππ =
π
2(π+π)
π΄πππ βπ ππ
π΄πππ βπππ =
π
4(π+π)
π΄πππ βπππ
π΄πππ βπππ =
3
8
(π
2(π+π))2 =
3
8 x
π
4(π+π)
Solving the above to get π
π. You will come across a
quadratic equation, on simplifying that you will get
the answer
26. In the following figure, PS bisects β QPR. The
area of βPQS = 40 sq. cm. and PR is 2.5 times of
PQ. Find the area of βPQR.
a) 35 sq. cm
b) 140 sq. cm
c) 70 sq. cm
d) 105 sq. cm
Solution:
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PS is the angle bisector of β OPR
β ππ
ππ =
ππ
ππ SR = 2.5QS
β Area βPSR = 2.5 x 40 = 100
β Area of βPQR = 100 + 40 = 140 sq. cm
27. In triangle ABC, AB = 10, AC = 7, and BC = 8. How
much should we slide it along AB so that the
area of the overlapping region (the shaded
triangle AβBD) is one β half the area of the
triangle ABC?
Solution:
Figure not drawn to scale
βA βDBβ and βACBβ are similar
β π΄πππ βπ΄β²π΅β²π·
π΄πππ βπ΄π΅β²πΆ =
(π΄β²π΅β²)2
(π΄π΅β²)2 β
π΄β²π΅β²
π΄π΅β² =
1
β2
β π΄β²π΅β²= 5β2 β AAβ = 10 - 5β2
28. Three circles are drawn touching each other,
their centers lying on a straight line. The line PT
is 16 units long and is tangent to the two smaller
circles, with points P and T lying on the larger
circle.
The area inside the largest circle but outside the
smaller two circles is equal to
a) 4π
b) 8π
c) 16π
d) 32π
Solution:
Let A, C, B be the centers of the smallest to the
largest circle respectively.
All O, A, B, C, Oβ would be collinear.
Let r1, r2, r3 be the radii off circle 1, 2, 3
respectively.
So r, 2r1 + 2r2 = 2r3
r1 + r2 = r3
As PQ is tangent to both the circles in side and a
chord of circle 3 so D will be the midpoint of PQ.
Now, OD. DOβ = PD. DQ (Result that holds in
case of chords inside a circle)
2r1. 2r2 = 8 . 8
r1r2 = 16
Required area = π(r1+r2)2 β r12 β r2
2)
= π(2r1r2)
= 32 π
29. Three squares of side lengths 3, 5 and 8 are kept
side by side. A corner of the smallest square is
joined to a corner of the biggest square, as
shown in the figure.
TC | CAT Geometry
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What is the area of the shaded region?
Solution:
In ββs ABE & ADG,
the ββs are similar
β΄ π΄π΅
π΅πΈ =
π΄π·
π·πΊ
3
BE =
16
8 β BE =
3
2 cms
Also βABE - βACF
Hence π΄π΅
π΅πΈ =
π΄πΆ
πΆπΉ β
3
3/2 =
8
πΆπΉ
CF = 4
β΄ Area of EBFC = Area of ACF β Area of ABE
= 1
2.8.4 -
1
2 . 3.
3
2
= 16 - 9
4 = 13.75
30. Square ABCD is inscribed inside a circle. Another
square is inscribed between square ABCD and
the circle such that its two vertices are on the
circle and one side lies along AB, as shown in the
figure.
The ratio of the length of the sides of
the smaller square and bigger square is
a) 1/5
b) 2/7
c) 3/8
d) 4/9
Solution:
Let O be the centre of circle
Let the sides of bigger & smaller squares be x & y
cm.
Hence in βOAB
AB = y + π₯
2, OA =
π¦
2, OB =
π₯
β2
β (π¦
2)2 + (
π₯
2 + y)2 = (
π₯
β2)2
Solving we get π₯
π¦ =
5
1
TC | CAT Geometry
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31. A warship and a submarine (completely
submerged in water) are moving horizontally in a
straight line. The captain of the warship observes
that the submarine makes an angle of depression
of 300, and the distance between them from the
point of observation is 50 km. After 30 minutes,
the angle of depression becomes 600.
Find the distance between then after 30 min
from the initial point of reference.
Solution:
Angle of Elevation:
Consider an object that is at a higher level than
the point from which it is observed. Then the
angle that the line of sight makes with the
horizontal is called the angle of elevation.
Angle of Depression:
Consider an object that is at a lower level than
the point from which it is observed. Then the
angle that the line of sight makes with the
horizontal is called the angle of depression.
For this question, refer the below figure:
The vertical distance between the warship and
the submarine = 25 km
β΄ When the angle of depression of the submarine
is 600, the distance between the warship and the
submarine is 25
π ππ600 = 50
β3 km
32. If both are moving in same direction and the
submarine is ahead of the warship in both the
situations, then the speed of the warship, if the
ratio of the speed of warship to that of the
submarine is 2:1, is:
Solution:
Let the speed of the submarine be x kmph.
Then the speed of the warship is 2x kmph.
Distance travelled by the warship in 30 minutes =
x km
Distance travelled by the submarine in 30
minutes = 0.5x km.
From the figure,
π₯ = 25β3 + 0.5π₯ - 25
β3
β΄ 0.5β3π₯ = 5
β΄ x = 100
β3 kmph
β΄ The speed of the warship = 200
β3 kmph
TC | CAT Geometry
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33. Adil is standing on top of a railway bridge
watching an approaching train. The angle of
depression of the topmost point of the start of
the train as it comes into sight is 300. It changes
to 450 by the time it comes to a halt. The height
of the train is 10 feet and the bridge is 60 feet tall.
Find the horizontal distance between the point
that the train comes into sight and the point at
which it halts.
Neglect Adilβs height.
Solution:
From the figure, JP = 50 feet.
β JQP = 450
tan 450 = JP
PQ
β΄ PQ = 50 feet
Also, β JKP = 300
tan 300 = JP
KP
β΄ KP = 50β3
Required distance = KQ = KP β PQ
= 50β3 β 50 = 50 (β3 β 1) feet
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