Learn Exercise 13.5 with Free Lessons & Tips

It can be observed that 1 round of wire will cover 3 mm height of cylinder.

Length of wire required in 1 round = Circumference of base of cylinder

= 2πr = 2π × 5 = 10π

Length of wire in 40 rounds = 40 × 10π

= 1257.14 cm = 12.57 m

Radius of wire 

Volume of wire = Area of cross-section of wire × Length of wire

= π(0.15)² × 1257.14

= 88.898 cm³

Mass = Volume × Density

= 88.898 × 8.88

= 789.41 gm

The double cone so formed by revolving this right-angled triangle ABC about its hypotenuse is shown in the figure.

Hypotenuse

= 5 cm

Area of ΔABC

Volume of double cone = Volume of cone 1 + Volume of cone 2

= 30.14 cm³

Surface area of double cone = Surface area of cone 1 + Surface area of cone 2

= πrl₁ + πrl₂

= 52.75 cm²

Volume of cistern = 150 × 120 × 110

= 198000 cm³

Volume to be filled in cistern = 198000 − 129600

= 185040 cm³

Let n numbers of porous bricks were placed in the cistern.

Volume of n bricks = n × 22.5 × 7.5 × 6.5

= 1096.875n

As each brick absorbs one-seventeenth of its volume, therefore, volume absorbed by these bricks 

n = 1792.41

Therefore, 1792 bricks were placed in the cistern.

Area of the valley = 7280 km²

If there was a rainfall of 10 cm in the valley then amount of rainfall in the valley = Area of the valley × 10 cm

Amount of rainfall in the valley = 7280 km² × 10 cm

Length of each river, l = 1072 km = 1072 × 1000 m = 107200 m

Breadth of each river, b = 75 m

Depth of each river, h = 3 m

Volume of each river = l × b × h

= 107200 × 75 × 3 m³

= 2.412 × 10⁸ m³

Volume of three such rivers = 3 × Volume of each river

= 3 × 2.412 × 10⁸ m³ 

= 7.236 × 10⁸ m³

Thus, the total rainfall is approximately same as the volume of the three rivers.