Rs Aggarwal 2019 2020 Solutions for Class 8 Maths Chapter 14 Polygons are provided here with simple step-by-step explanations. These solutions for Polygons are extremely popular among Class 8 students for Maths Polygons Solutions come handy for quickly completing your homework and preparing for exams. All questions and answers from the Rs Aggarwal 2019 2020 Book of Class 8 Maths Chapter 14 are provided here for you for free. You will also love the ad-free experience on Meritnation’s Rs Aggarwal 2019 2020 Solutions. All Rs Aggarwal 2019 2020 Solutions for class Class 8 Maths are prepared by experts and are 100% accurate.

Page No 182:

Answer:

Exterior angle of an n-sided polygon = 360no
(i) For a pentagon: n=5  360n=3605=72o

(ii) For a hexagon: n=6  360n=3606=60o


(iii) For a heptagon: n=7  360n=3607=51.43o


(iv) For a decagon: n=10  360n=36010=36o

(v) For a polygon of 15 sides: n=15  360n=36015=24o

Page No 182:

Answer:

Each exterior angle of an n-sided polygon = 360no
If the exterior angle is 50°, then:

 360n=50n=7.2

Since n is not an integer, we cannot have a polygon with each exterior angle equal to 50°.

Page No 182:

Answer:

For a regular polygon with n sides:
Each interior angle = 180 - Each exterior angle=180-360n

(i) For a polygon with 10 sides:
  Each exterior angle = 36010=36o Each interior angle = 180-36=144o

(ii) For a polygon with 15 sides:
   Each exterior angle = 36015=24o Each interior angle = 180-24=156o

Page No 182:

Answer:

Each interior angle of a regular polygon having n sides = 180 - 360n=180n-360n

If each interior angle of the polygon is 100°, then:

100 =180n-360n 100n = 180n - 360 180n-100n=360  80n=360  n=36080=4.5

Since n is not an integer, it is not possible to have a regular polygon with each interior angle equal to 100°.

Page No 182:

Answer:

Sum of the interior angles of an n-sided polygon = n-2×180°

(i) For a pentagon:
n=5 n-2×180°=5-2×180°=3×180° = 540°

(ii) For a hexagon:
 n=6 n-2×180°=6-2×180°=4×180° = 720°

(iii) For a nonagon:
n=9 n-2×180°=9-2×180°=7×180° = 1260°

(iv) For a polygon of 12 sides:
n=12 n-2×180°=12-2×180°=10×180° = 1800°

Page No 182:

Answer:

Number of diagonal in an n-sided polygon = nn-32
(i) For a heptagon:

 n=7nn-32=77-32=282=14

(ii) For an octagon:

 n=8nn-32=88-32=402=20

(iii) For a 12-sided polygon:

 n=12nn-32=1212-32=1082=54

Page No 182:

Answer:

Sum of all the exterior angles of a regular polygon is 360o​.

(i)
Each exterior angle=40oNumber of sides of the regular polygon = 36040=9

(ii)
Each exterior angle=36oNumber of sides of the regular polygon= 36036=10

(iii)
Each exterior angle=72oNumber of sides of the regular polygon = 36072=5

(iv)
Each exterior angle=30oNumber of sides of the regular polygon = 36030=12

Page No 182:

Answer:

Sum of all the interior angles of an n-sided polygon = n-2×180°

mADC=180-50=130omDAB=180-115 =65omBCD=180-90=90o mADC+mDAB+mBCD+mABC=n-2×180°=(4-2)×180°=2×180°=360°  mADC+mDAB+mBCD+mABC = 360° 130o + 65o + 90o + mABC = 360° 285o+mABC=360o mABC=75o mCBF = 180 - 75 = 105o
∴ x = 105

Page No 182:

Answer:

For a regular n-sided polygon:
Each interior angle = 180-360n
In the given figure:
   n=5 x° = 180-3605     =180-72     =108o
∴ x = 108

Page No 182:

Answer:

(a) 5

For a pentagon:
n=5

Number of diagonals = nn-32=55-32=5

Page No 182:

Answer:

(c) 9
Number of diagonals in an n-sided polygon = nn-32
For a hexagon:

n=6 nn-32=66-32                    =182=9

Page No 182:

Answer:

(d) 20

​For a regular n-sided polygon:
Number of diagonals =: nn-32
For an octagon:

 n=888-32=402=20

Page No 182:

Answer:

(d) 54
For an n-sided polygon:
Number of diagonals = nn-32

 n=121212-32=54

Page No 182:

Answer:

(c) 9

nn-32=27 nn-3=54 n2-3n-54 = 0 n2-9n+6n-54=0 nn-9+6n-9=0 n=-6 or n=9Number of sides cannot be negative. n =9



Page No 183:

Answer:

(b) 68°
​Sum of all the interior angles of a polygon with n sides = n-2×180°

(5-2)×180o=x+x+20+x+40+x+60+x+80 540 = 5x + 200 5x = 340 x = 68o

Page No 183:

Answer:

(b) 9
Each exterior angle of a regular n-sided polygon = 360n=40                                                           n=36040=9

Page No 183:

Answer:

(c) 5
​Each interior angle for a regular n-sided polygon = 180-360n

180-360n=108 360n=72 n=36072=5

Page No 183:

Answer:

(a) 8
Each interior angle of a regular polygon with n sides = 180 - 360n  180 - 360n=135 360n=45 n= 8

Page No 183:

Answer:

(b) 8
For a regular polygon with n sides:
Each exterior angle = 360n
Each interior angle = 180-360n

180-360n=3360n 180 = 4360n n=4×360180=8

Page No 183:

Answer:

(c) 144°
Each interior angle of a regular decagon = 180-36010=180-36=144o

Page No 183:

Answer:

(b) 8 right s
Sum of all the interior angles of a hexagon is 2n-4 right angles.
For a hexagon:
n=6 2n-4 right ∠s=12-4 right ∠s=8 right ∠s

Page No 183:

Answer:

(a) 135°

2n-4×90=10802n-4=122n=16or n=8Each interior angle = 180 - 360n=180 - 3608=180 - 45 =135o

Page No 183:

Answer:

(d) 10

Each exterior angle of a regular polygon = 360nEach interior angle of a regular polygon = 180-360n180-360n-108 =360n720n=180-108=72n=72072=10



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