Question 1

A triangular prism has a triangular base with area 24 cm² and height 15 cm. What is the volume of the prism?

Accepted Answer

Step 1: Identify the formula for volume of a prism: V = Base Area × Height. Step 2: Substitute values: V = 24 × 15 = 360 cm³. Therefore, the volume is 360 cm³.

Question 2

A rectangular prism has dimensions 8 cm × 6 cm × 5 cm. What is its total surface area?

Accepted Answer

Step 1: Use surface area formula for rectangular prism: SA = 2(lw + lh + wh). Step 2: Calculate each product: lw = 8×6 = 48, lh = 8×5 = 40, wh = 6×5 = 30. Step 3: SA = 2(48 + 40 + 30) = 2(118) = 236 cm². Therefore, the surface area is 236 cm².

Question 3

A pyramid with a square base has a base side of 14 cm and volume of 1372 cm³. What is the height of the pyramid?

Accepted Answer

Step 1: Calculate base area: A = 14² = 196 cm². Step 2: Use volume formula: V = (1/3) × A × h, so 1372 = (1/3) × 196 × h. Step 3: 1372 = (196h)/3. Step 4: h = (1372 × 3)/196 = 4116/196 = 21 cm. Therefore, the height is 21 cm.

Question 4

A rectangular prism has dimensions 8 cm × 6 cm × 5 cm. If the lateral surface area of the prism is calculated (excluding top and bottom faces), what is the lateral surface area in cm²?

Accepted Answer

Step 1: Lateral surface area of a rectangular prism = 2h(l + b), where h is height, l is length, b is breadth. Step 2: Here, l = 8 cm, b = 6 cm, h = 5 cm. Step 3: Lateral SA = 2 × 5 × (8 + 6) = 10 × 14 = 140 cm². Therefore, the answer is 140 cm².

Question 5

A pyramid with a square base has a base side of 12 cm and a height of 8 cm. What is the volume of the pyramid in cm³?

Accepted Answer

Step 1: Volume of pyramid = (1/3) × Base area × Height. Step 2: Base area = 12² = 144 cm². Step 3: Volume = (1/3) × 144 × 8 = (1/3) × 1152 = 384 cm³. Therefore, the answer is 384 cm³.

Question 6

A rectangular prism has a volume of 480 cm³. Its length is 12 cm and width is 8 cm. What is the height of the prism in cm?

Accepted Answer

Step 1: Volume of rectangular prism = length × width × height. Step 2: 480 = 12 × 8 × h. Step 3: 480 = 96 × h. Step 4: h = 480 ÷ 96 = 5 cm. Therefore, the height is 5 cm.

Question 7

A triangular pyramid (tetrahedron) has an equilateral triangular base with side 8 cm. The height of the pyramid is 4√6 cm. What is the volume of the pyramid?

Accepted Answer

Step 1: For an equilateral triangle with side 8 cm, area = (√3/4) × 8² = (√3/4) × 64 = 16√3 cm². Step 2: Volume of pyramid = (1/3) × base area × height = (1/3) × 16√3 × 4√6. Step 3: Simplify: (1/3) × 16 × 4 × √3 × √6 = (1/3) × 64 × √18 = (1/3) × 64 × 3√2 = 64√2 cm³.

Question 8

A hexagonal prism has a regular hexagonal base with side 5 cm. The lateral surface area of the prism is 600 cm². What is the height of the prism?

Accepted Answer

Step 1: A regular hexagon with side 5 cm has perimeter = 6 × 5 = 30 cm. Step 2: Lateral surface area of a prism = perimeter × height. Step 3: 600 = 30 × height. Step 4: height = 600 ÷ 30 = 20 cm.

SBI Clerk Prism & Pyramid

Prism & Pyramid— Rules & Concept

Key Points to Remember

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Prism & Pyramid — Practice Questions

60-Second Revision — Prism & Pyramid