If the length of one of the diagonals of a square is p units, then whatis the perimeter of the square? About the author Aubrey
UR ANSWER:- The length of one diagonal/side of the square is p unit. Perimeter of square =》 4 ×sides =》4×p = 4p. Hence, Perimeter = 4p. Reply
Answer: Answer is 4p/√2. Step-by-step explanation: SOLUTION Given, AC is diagonal, AC is also p unit. AB = BC = CD = DA = a units. Find, the perimeter of square. SO, We have to use Pythagoras Theorem. => AC² = AB² + BC² => p² = a² + a² => p = √2a => a = p/√2 Now, We have to multiply with 4 as square has four sides. => Perimeter = 4 × AB => Perimeter = 4a => Perimeter = 4p/√2 (Given, a = p/√2) Hence, Perimeter of square is 4p/√2 Reply
UR ANSWER:-
The length of one diagonal/side of the square
is p unit.
Perimeter of square =》 4 ×sides
=》4×p = 4p.
Hence, Perimeter = 4p.
Answer:
Answer is 4p/√2.
Step-by-step explanation:
SOLUTION
Given,
AC is diagonal, AC is also p unit.
AB = BC = CD = DA = a units.
Find,
the perimeter of square.
SO,
We have to use Pythagoras Theorem.
=> AC² = AB² + BC²
=> p² = a² + a²
=> p = √2a
=> a = p/√2
Now,
We have to multiply with 4 as square has four sides.
=> Perimeter = 4 × AB
=> Perimeter = 4a
=> Perimeter = 4p/√2 (Given, a = p/√2)
Hence,
Perimeter of square is 4p/√2