Question

A conical tent is 10m high and the radius of its base is 24m find
1. slant height of tent{assume π=22/7​

Answer 1

Answer:

given,

height ( h) = 10m

base radius (r) = 24m

(1) slant height = √{height ² + radius ²}

= √{10² + 24²} = 26m

HOPE IT HELPS YOU!

Answer 2

• Slant height of tent is 26 cm.

Step-by-step explanation:

Given:-

• Height of conical tent is 10 m.
• Radius of conical tent is 24 cm.

To find:-

• Slant height.

Solution:-

Let, the Slant height be l .

We know that,

Shape of any conical tent is cone.

Formula for Slant height is :

◆ Slant height² = Height² + Radius²

➝ l² = (10)² + (24)²

➝ l² = 100 + 576

➝ l² = 676

➝ l = √676

➝ l = 26

Therefore,

Slant height of conical tent is 26 m.

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More formulas :-

• Surface area of a cuboid = 2 (lb + bh + hl)

• Surface area of a cube = 6a²

• Curved surface area of a cylinder = 2πrh

• Total surface area of a cylinder = 2πr(r+h)

• Curved surface area of a cone = πrl

• Total surface area of a right circular = πrl + πr²

• Surface area of a sphere =4πr²

• Curved surface area of a hemisphere = 2πr²

• Total surface area of a hemisphere = 3πr²

• Volume of a cube = a³

• Volume of a cylinder = πr²h

• Volume of a cone = 1/3πr²h

• Volume of a sphere =4/3πr²

• Volume of a hemisphere = 2/3πr²