Difference between revisions of "List of formulae"

From Karnataka Open Educational Resources
Jump to navigation Jump to search
Line 8: Line 8:
 
{|class="wikitable"
 
{|class="wikitable"
 
|-
 
|-
 +
|Name
 
|Shape
 
|Shape
 
|Perimeter
 
|Perimeter
Line 13: Line 14:
 
|-
 
|-
 
|Triangle
 
|Triangle
 +
|[[Image:Triangle.png]]
 
|(a+b+c), where a, b, c are sides
 
|(a+b+c), where a, b, c are sides
|<math>\frac{1}{2}*b*h</math>
+
|<math>\frac{1}{2}bh</math>
 
where "h" is the height from any vertex to the opposite side "b"
 
where "h" is the height from any vertex to the opposite side "b"
 
|-
 
|-

Revision as of 22:00, 15 August 2014

Algebraic Identities

Geometric Results

Formulae for commercial arithmetic

Statistical Formulae

Mensuration

Area and Perimeter of Plane Figures

Name Shape Perimeter Area
Triangle Triangle.png (a+b+c), where a, b, c are sides

where "h" is the height from any vertex to the opposite side "b"

Circle
type square root

LSA(CSA) TSA & VOLUME of Solid Figures

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
l is the slant height

Where B= is the area of base

Where B=

2)SQUARE BASED RIGHT PYRAMID

Where P=4a is the perimeter of base square
l is the slant height

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 (syntax error): {\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