Perimeter and Area of Geometrical figures
Rectangle:
The perimeter of rectangle = 2(l + b).
Area of rectangle = l × b; (l and b are the length and breadth of rectangle)
Diagonal of rectangle =
Square:
Perimeter of square = 4 × S.
Area of square = S × S.
Diagonal of square = S√2; (S is the side of square)
Triangle:
Perimeter of triangle = (a + b + c); (a, b, c are 3 sides of a triangle)
Area of triangle = (s is the semi-perimeter of triangle)
S = (a + b + c)
Area of triangle = × b × h; (b base , h height)
Area of an equilateral triangle = (a is the side of triangle)
Parallelogram:
Area of triangle = (s is the semi-perimeter of triangle)
S = (a + b + c)
Area of triangle = × b × h; (b base , h height)
Area of an equilateral triangle = (a is the side of triangle)
Parallelogram:
Perimeter of parallelogram = 2 (sum of adjacent sides)
Area of parallelogram = base × height
Rhombus:
Area of parallelogram = base × height
Rhombus:
Area of rhombus = base × height
Area of rhombus = × length of one diagonal × length of other diagonal
Perimeter of rhombus = 4 × side
Trapezium:
Area of trapezium =(sum of parallel sides) × (perpendicular distance between them)
= ☐(p1 + p2) × h (p1, p2 are two parallel sides)
Circle:
Circumference of circle = 2πr
= πd
Where, π = 3.14 or π = 22/7
r is the radius of circle
d is the diameter of circle
Area of circle = πr2
Area of ring = Area of outer circle - Area of inner circle.
Theorems
Parallelograms standing on the same base and between the same parallel lines are equal in area.
Given: ☐PQRS and ☐AQRB are standing on the same base and between the same paralleled lines
TO prove: ☐PQRS = ☐AQRB
S. NO | Statement | Reason |
1. 2. 3. 4. 5. 6. | In Δ PQAand ΔSRB ∠ PAQ=∠ AQR =∠ SRB(A) ∠ APQ=∠ SRQ =∠ RSB(A) AQ= BR (S) Δ PQA≃ΔSRB Δ PQA+ AQRS=AQRS +ΔSRB ☐PQRS = ☐AQRB | Being an alternate angleand opposite angle of parallelogram Being an alternate angleand opposite angle of parallelogram Opposite side of the parallelogram BYA.A. Saxiom Adding common part From 5 |
The area of the triangle is equal to the area of the parallelograms, both standing on the same base and between the sane parallel lines
Given:Δ TQR and☐PQRS are standing on the same base and between the same parallel linesPT and RQ
TO prove: Δ TQR == ☐ PQRS
Construction:join QU
S.No | Statement | Reason |
1. 2. 3. 4. | RQUTis a parallelogram Δ TQR =☐TRQU ☐TRQU = ☐QRSP Δ TQR = ☐TRQU | By constructionQU || TR The diagonal bisects the parallelogram. Parallelogram standing on the same base and between the same parallel lines are equal in area From 2 and 3 |
Examples 1
ABCD and PQRD are the two parallelograms
Prove that:
☐ABCD =☐PQRD
Given: ABCD and PQRD are parallelogram
To prove:☐ABCD = ☐PQRD
S.NO | Statement | Reason |
1. 2. 3. | Δ DPC=☐ ABCD Δ DPC=☐PQRD ☐ ABCD = ☐PQRD | 1. Triangle and the parallelogram standing on the same base and between the same parallel lines. 2. Triangle and the parallelogram standing on the same base and between the same parallel lines. From2 and 3 |
Examples 2
In the given figure, ABCD is the parallelogram X is the any point within it .Prove that he sum of the area of XCD and XCB is equal to half of the area of ABCD .
Given: ABCD is a parallelogram X is at any point in centre.
To prove:Δ XCD + Δ XAB =parallelogram ABCD
Construction: Draw MN || AB
S.NO | Statement | Reason |
1. 2. 3. 4. | MNCD is a parallelogram ABNM is a parallelogram Δ XCD =MNCD Δ XAB= ABNM | AB ||MNand AB ||CD AB ||MNand AB ||CD Triangle and the parallelogram standing on the same base and between same parallel lines Triangle and the parallelogram standing on the same base and between same parallel lines |
Tags:
Notes