A farmer was having a field in the form of a parallelogram PQRS. She took any point A on RS and joined it to points P and Q. In how many parts the fields is divided? What are the shapes of these parts? The farmer wants to sow wheat and pulses in equal portions of the field separately. How should she do it?
Answers
Answer:
3 Parts
Triangular
ΔPAS , ΔPAQ & ΔQAR
Join mid point of opposite sides to get two equal area
Step-by-step explanation:
point A on RS joined with points P and Q
in 3 Parts the fields is divided
All parts are Triangle Shaped
ΔPAS , ΔPAQ & ΔQAR
shapes of these parts are Triangular
The farmer wants to sow wheat and pulses in equal portions of the field separately
She should Take mid point of Two opposit sides & join them
Then She will get Two Parallelogram fields with equal area
Solution:
The field is divided into three parts each in triangular shape.
Let, ΔPSA, ΔPAQ and ΔQAR be the triangles.
Step By step:
Area of (ΔPSA + ΔPAQ + ΔQAR) = Area of PQRS ........ (i)
Area of ΔPAQ = ½ area of PQRS ....... (ii)
Here,
The triangle and parallelogram are on the same base and in-between the same parallel lines.
From (i) and (ii),
Area of ΔPSA +Area of ΔQAR = ½ area of PQRS ...... (iii)
From (ii) and (iii), we can conclude that,;
The farmer must sow wheat or pulses in ΔPAQ or either in both ΔPSA and ΔQAR.