Question

class 10th
chapter 12
exercise 12.3
solutions...
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Answer 1

QUESTION 7)

• Side of square = 14 cm
• Four quadrants are included in the four sides of the square.
• ∴ Radius of the circles = 14/2 cm = 7 cm
• Area of the square ABCD = 142 = 196 cm2
• Area of the quadrant = (πR2)/4 cm2 = (22/7) ×72/4 cm2
• = 77/2 cm2
• Total area of the quadrant = 4×77/2 cm2 = 154cm2
• Area of the shaded region = Area of the square ABCD – Area of the quadrant
• = 196 cm2 – 154 cm2
• = 42 cm2

QUESTION 8)

• Width of the track = 10 m
• Distance between two parallel lines = 60 m Length of parallel tracks = 106 m DE = CF = 60 m
• Radius of inner semicircle, r = OD = O’C
• = 60/2 m = 30 m
• Radius of outer semicircle, R = OA = O’B
• = 30+10 m = 40 m
• Also, AB = CD = EF = GH = 106 m
• Distance around the track along its inner edge = CD+EF+2×(Circumference of inner semicircle)
• = 106+106+(2×πr) m = 212+(2×22/7×30) m
• = 212+1320/7 m = 2804/7 m
• Area of the track = Area of ABCD + Area EFGH + 2 × (area of outer semicircle) – 2 × (area of inner semicircle)
• = (AB×CD)+(EF×GH)+2×(πr2/2) -2×(πR2/2) m2
• = (106×10)+(106×10)+2×π/2(r2-R2) m2
• = 2120+22/7×70×10 m2
• = 4320 m2

QUESTION 9)

• Radius of larger circle, R = 7 cm
• Radius of smaller circle, r = 7/2 cm
• Height of ΔBCA = OC = 7 cm
• Base of ΔBCA = AB = 14 cm
• Area of ΔBCA = 1/2 × AB × OC = (½)×7×14 = 49 cm2
• Area of larger circle = πR2 = (22/7)×72 = 154 cm2
• Area of larger semicircle = 154/2 cm2 = 77 cm2
• Area of smaller circle = πr2 = (22/7)×(7/2)×(7/2) = 77/2 cm2
• Area of the shaded region = Area of larger circle – Area of triangle – Area of larger semicircle + Area of smaller circle
• Area of the shaded region = (154-49-77+77/2) cm2
• = 133/2 cm2 = 66.5 cm2

QUESTION 10)

• ABC is an equilateral triangle.
• ∴ ∠ A = ∠ B = ∠ C = 60°
• There are three sectors each making 60°.
• Area of ΔABC = 17320.5 cm2
• ⇒ √3/4 ×(side)2 = 17320.5
• ⇒ (side)2 =17320.5×4/1.73205
• ⇒ (side)2 = 4×104
• ⇒ side = 200 cm
• Radius of the circles = 200/2 cm = 100 cm
• Area of the sector = (60°/360°)×π r2 cm2
• = 1/6×3.14×(100)2 cm2
• = 15700/3cm2
• Area of 3 sectors = 3×15700/3 = 15700 cm2
• Thus, area of the shaded region = Area of equilateral triangle ABC – Area of 3 sectors
• = 17320.5-15700 cm2 = 1620.5 cm2

QUESTION 11)

• Number of circular designs = 9
• Radius of the circular design = 7 cm
• There are three circles in one side of square handkerchief.
• ∴ Side of the square = 3×diameter of circle = 3×14 = 42 cm
• Area of the square = 42×42 cm2 = 1764 cm2
• Area of the circle = π r2 = (22/7)×7×7 = 154 cm2
• Total area of the design = 9×154 = 1386 cm2

QUESTION 12)

• Radius of the quadrant = 3.5 cm = 7/2 cm
• (i) Area of quadrant OACB = (πR2)/4 cm2
• = (22/7)×(7/2)×(7/2)/4 cm2
• = 77/8 cm2
• (ii) Area of triangle BOD = (½)×(7/2)×2 cm2
• = 7/2 cm2
• Area of shaded region = Area of quadrant – Area of triangle BOD
• = (77/8)-(7/2) cm2 = 49/8 cm2
• = 6.125 cm2

QUESTION 13)

• Side of square = OA = AB = 20 cm
• Radius of the quadrant = OB
• OAB is right angled triangle
• By Pythagoras theorem in ΔOAB,
• OB2 = AB2+OA2
• ⇒ OB2 = 202 +202
• ⇒ OB2 = 400+400
• ⇒ OB2 = 800
• ⇒ OB= 20√2 cm
• Area of the quadrant = (πR2)/4 cm2 = (3.14/4)×(20√2)2 cm2 = 628cm2
• Area of the square = 20×20 = 400 cm2
• Area of the shaded region = Area of the quadrant – Area of the square
• = 628-400 cm2 = 228cm2

QUESTION 14)

• Radius of the larger circle, R = 21 cm
• Radius of the smaller circle, r = 7 cm
• Angle made by sectors of both concentric circles = 30°
• Area of the larger sector = (30°/360°)×πR2 cm2
• = (1/12)×(22/7)×212 cm2
• = 231/2cm2
• Area of the smaller circle = (30°/360°)×πr2 cm2
• = 1/12×22/7×72 cm2
• =77/6 cm2
• Area of the shaded region = (231/2) – (77/6) cm2
• = 616/6 cm2 = 308/3cm2

QUESTION 15)

• Radius of the quadrant ABC of circle = 14 cm
• AB = AC = 14 cm
• BC is diameter of semicircle.
• ABC is right angled triangle.
• By Pythagoras theorem in ΔABC,
• BC2 = AB2 +AC2
• ⇒ BC2 = 142 +142
• ⇒ BC = 14√2 cm
• Radius of semicircle = 14√2/2 cm = 7√2 cm
• Area of ΔABC =( ½)×14×14 = 98 cm2
• Area of quadrant = (¼)×(22/7)×(14×14) = 154 cm2
• Area of the semicircle = (½)×(22/7)×7√2×7√2 = 154 cm2
• Area of the shaded region =Area of the semicircle + Area of ΔABC – Area of quadrant
• = 154 +98-154 cm2 = 98cm2

QUESTION 16)

• AB = BC = CD = AD = 8 cm
• Area of ΔABC = Area of ΔADC = (½)×8×8 = 32 cm2
• Area of quadrant AECB = Area of quadrant AFCD = (¼)×22/7×82
• = 352/7 cm2
• Area of shaded region = (Area of quadrant AECB – Area of ΔABC) = (Area of quadrant AFCD – Area of ΔADC)
• = (352/7 -32)+(352/7- 32) cm2
• = 2×(352/7-32) cm2
• = 256/7 cm2

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Answer 2

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What are Tissues in Biology.

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Animal cells and plant cells can form tissues , such as muscle tissue in animals. A living tissue is made from a group of cells with a similar structure and function, which all work together to do a particular job.

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There are 4 basic types of tissue: connective tissue, epithelial tissue, muscle tissue, and nervous tissue. Connective tissue supports other tissues and binds them together (bone, blood, and lymph tissues). Epithelial tissue provides a covering (skin, the linings of the various passages inside the body).

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We're asked to check whether a square pyramid, satisfying the following properties, really exists or not.

Since the square pyramid is made using a square of side 16 cm,

Length of base edge, \sf{a=16\ cm}a=16 cm

The triangle used to make has one side of length 16 cm, which should be attached to side of the square, so that the other sides of the triangle, measuring 10 cm each, should be slant edge of the square pyramid.

Length of slant edge, \sf{e=10\ cm}e=10 cm

Let's find the height of the square pyramid, \sf{h,}h, which is given by,

$\longrightarrow\sf{h=\sqrt{e^2-[(\dfrac{a}{2})^2+(\dfrac{a}{2})^2]}}$⟶h=

$\longrightarrow\sf{h=\sqrt{e^2-[\dfrac{a^2}{4}+\dfrac{a^2}{4}]}}$⟶h=

$\longrightarrow\sf{h=\sqrt{e^2-\dfrac{2a^2}{4}}}$⟶h=

$\longrightarrow\sf{h=\sqrt{e^2-\dfrac{a^2}{2}}}$⟶h=

Putting values of \sf{e}e and \sf{a,}a,

$\longrightarrow\sf{h=\sqrt{10^2-\dfrac{16^2}{2}}}$⟶h=

$\longrightarrow\sf{h=\sqrt{100-\dfrac{256}{2}}}$⟶h=

$\longrightarrow\sf{h=\sqrt{100-128}}$⟶h=

$\longrightarrow\sf{h=\sqrt{-28}\ cm}$⟶h=

Well, square root of a negative number is not real. This implies the square pyramid does not exist.

Hence, we can't make a square pyramid using square of side 16cm, and four triangles each with one side 16 cm and the other two sides of 10 cm each.