Leaf decoration

Unit 6: Prism

Book Icon

Class 9: Mathematics

Prism, Base of a Prism, Height of a Prism, Cross-Section of a Prism, Lateral Surface Area (LSA), Total Surface Area (TSA), Volume of Prism

AI-Powered
TL;DR — Quick Summary
Click Generate Summary to get a quick AI-powered overview of this chapter.
Gemini is reading the chapter...
    Could not generate summary. Please try again.
    Explain This
    AI Explanation
    Explaining...

    Could not explain. Try again.
    MCQ Practice
    Video Lessons

    Prism

    A prism is a solid geometric figure with two parallel, flat surfaces connected by rectangular faces. The bases can be any polygon (triangular, rectangular, pentagonal, etc.), and the cross-section along the length of the prism remains the same.

    1. Base of a Prism

    The base of a prism refers to one of the two parallel, congruent faces of the prism. These bases determine the shape and type of the prism (e.g., if the base is a triangle, it’s a triangular prism).

    2. Height of a Prism

    The height of a prism is the perpendicular distance between its two bases. It represents the depth or length of the prism.

    3. Cross-section of a Prism

    The cross-section of a prism is the shape obtained when you make a straight cut parallel to the bases. The cross-sectional area remains constant throughout the length of the prism.

     

    Surface Areas and Volume of a Prism

    1. Lateral Surface Area (LSA) of a Prism

    The Lateral Surface Area of a prism is the area of the faces excluding the two bases. It is the total area of all rectangular faces connecting the bases.

    Formula: 

    \(\text{LSA} = \text{Perimeter of Base} \times \text{Height}\)

    2. Total Surface Area (TSA) of a Prism

    The Total Surface Area of a prism is the sum of the areas of all its faces, including both bases and the lateral faces.

    Formula: 

    \(\text{TSA} = \text{LSA} + 2 \times \text{Area of Base}\)

    or

    \(\text{TSA} = (\text{Perimeter of Base} \times \text{Height}) + 2 \times\text{Area of Base}\)

     

    Volume of a Prism

    The volume of a prism is the amount of space enclosed within it.

    Formula: 

    \(\text{Volume} = \text{Area of Base} \times \text{Height}\)

     

    Summary

    1. LSA tells us only about the side faces.

    2. TSA includes all faces (side faces + bases).

    3. Volume tells us how much space is inside the prism.

     

    Share Now

    Share to help more learners!

    Resources
    Lesson Contents
    AUTO