Advertisements
Advertisements
प्रश्न
In a rectangle ABCD, AB = 25 cm and BC = 15. In what ratio does the bisector of ∠C divide AB?
Advertisements
उत्तर
Given, AB = 25 cm and BC = 15 cm
Now, In rectangle ABCD,
CO is the bisector of ∠C and it divides AB.
∴ ∠OCB = ∠OCD = 45°
∴ ∠OCB = ∠OCD = 45°
In ΔOCB, we have
∠CBO + ∠OCB + ∠COB = 180° ...[Angle sum property of triangle]
90° + 45° + ∠COB = 180°
∠COB = 180° – 90° + 45°
∠COB = 180° – 135° = 45°
Now, In ΔOCB,
∠OCB = ∠COB
Then, OB = OC
⇒ OB = 15 cm
CO divides AB in the ratio AO : OB
Let AO be x, then OB = AB – x = 25 – x
Hence, AO : OB = x : 25 – x
⇒ 10 : 15
⇒ 2 : 3
APPEARS IN
संबंधित प्रश्न
In the following figure, ABCD and AEFG are parallelograms. If ∠C = 55°, what is the measure of ∠F?
In the following figure, BDEF and DCEF are each a parallelogram. Is it true that BD = DC? Why or why not?
Which of the following statement is true for a rectangle?
It has two pairs of equal sides.
Which of the following statement is true for a rectangle?
Its diagonals bisect each other.
The sides of a rectangle are in the ratio 2 : 3, and its perimeter is 20 cm. Draw the rectangle.
Diagonals of a rectangle ABCD intersect at point O. If AC = 8 cm then find BO and if ∠CAD =35° then find ∠ACB.
State with Reason Whether the Following Statement is ‘True’ Or ‘False’.
Every rectangle is a parallelogram.
If diagonals of a quadrilateral are equal, it must be a rectangle.
In rectangle READ, find ∠EAR, ∠RAD and ∠ROD
In rectangle PAIR, find ∠ARI, ∠RMI and ∠PMA.
