List of formulae
Algebraic Identities
Geometric Results
Formulae for commercial arithmetic
Statistical Formulae
Mensuration
Area and Perimeter of Plane Figures
LSA(CSA) TSA & VOLUME of Solid Figures
Name | Perimeter | Area |
Triangle | (a+b+c), where a, b, c are sides |
where "h" is the height from any vertex to the opposite side "b" |
Circle | ||
Square |
Where a is the side of a square |
|
Rectangle |
Where l & b are the length & breadth |
|
Trapezium |
Where a,b,c and d are the sides |
Where a and b are parallel sides of trapezium. And h is the perpendicular distance between two parallel sides. |
Parallelogram |
Where a & b are the sides of Parallelogram |
Where b is base and h is the perpendicular distance between base b and its parallel side. |
Name of the Solid | LSA(CSA)in sq.units | TSA in sq.units | VOLUME in cubic units |
CUBE |
Where lenght(l)=breadth(b)=height(h) |
||
CUBOID | |||
PRISM
1)EQUILATERAL TRIANGLE RIGHT PRISM |
Where P=3a is the perimeter of base triangle |
Where B= is the area of base |
Where B= |
2)SQUARE BASED RIGHT PRISM |
Where P=4a is the perimeter of base square |
Where B= is the area of base |
Where B= |
PYRAMID
1)EQUILATERAL TRIANGLE BASED RIGHT PYRAMID |
Where P=3a is the perimeter of base triangle |
Where B= is the area of base |
Where B= |
2)SQUARE BASED RIGHT PYRAMID |
Where P=4a is the perimeter of base square |
Where B= is the area of base |
Where B= |
CYLINDER |
Where r is the radius of circular base |
where "h" is the height of cylinder |
|
CONE |
Where l is the slant height |
Where r is the radius of circular base |
Where h is the height or depth of the cone |
FRUSTUM OF CONE |
Where l= |
Failed to parse (MathML with SVG or PNG fallback (recommended for modern browsers and accessibility tools): Invalid response ("Math extension cannot connect to Restbase.") from server "https://en.wikipedia.org/api/rest_v1/":): {\displaystyle π{{(r_{1}+r_{2})l+r_{1}^2+r_{2}^2}}}
Where & are the radii of two bases |
Where h is the height or depth of the frustum ofcone |
SPHERE | |||
HEMISPHERE |