Question

The length of diagonals of a square . ————- each other  ​

Answer 1

Answer:

The diagonals of a square intersect (cross) in a 90 degree angle. This means that the diagonals of a square are * *perpendicular* to each other

Answer 2

Answer:

Step-by-step explanation:

Diagonal of square is a line segment that connects two opposite vertices of the square. As we have four vertices of a square, thus we can have two diagonals within a square. Diagonals of the square are always greater than its sides.

Below given are some important relation of diagonal of a square and other terms related to the square.

Relation between Diagonal ‘d’ and side ‘a’ of a square d=a2‾√

Relation between Diagonal ‘d’ and Area ‘A’ of a Square- d=2A‾‾‾√

Relation between Diagonal ‘d’ and Perimeter ‘P’ of a Square- d=P22√

Relation between Diagonal ‘d’ and Circumradius ‘R’ of a square: d = 2R

Relation between Diagonal ‘d’ and diameter of the Circumcircle d=Dc

Relation between Diagonal ‘d’ and In-radius (r) of a circle- d=22‾√r

Relation between Diagonal ‘d’ and diameter of the In-circle d=2‾√Di

Relation between diagonal and length of the segment l- d=l210√5

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