Let A B C be a triangle with angle B=90°. Let A D be the bisector of angle A with D on B C. Suppose A C=6 cm and the area of the triangle A D C is 10 cm 2. Then, the length of B D in cm is equal to

Question

Let A B C be a triangle with angle B=90°. Let A D be the bisector of angle A with D on B C. Suppose A C=6 cm and the area of the triangle A D C is 10 cm 2. Then, the length of B D in cm is equal to (A) (3/5) (B) (3/10) (C) (5/3) (D) (10/3)

Tardigrade Admin · Accepted Answer

Given, A B C is right angled triangle with B is 90°. <img class="img-fluid question-image" alt="image" src="https://cdn.tardigrade.in/img/question/mathematics/a0d781713020faac1640869eca65acee-.png" /> A D is angle bisector of angle A. ∴ (A B/A C)=(B D/D C) ⇒ A B ⋅ C D=B D ⋅ A C Area of triangle A D C=10 ⇒ (1/2) × A B ⋅ C D=10 ⇒ (1/2) × B D ⋅ A C=10 arrow B D=(20/A C) ⇒ B D=(20/6) [∵ A C=6] ⇒ B D=(10/3)

Q. Let $A BC$ be a triangle with $∠ B = 9 0^{\circ}$ . Let $A D$ be the bisector of $∠ A$ with $D$ on $BC$ . Suppose $A C = 6 c m$ and the area of the $△ A D C$ is $10 c m^{2}$ . Then, the length of $B D$ in $c m$ is equal to

$\frac{3}{5}$

$\frac{3}{10}$

$\frac{5}{3}$

$\frac{10}{3}$

Q. Let ABC be a triangle with ∠B=90∘. Let AD be the bisector of ∠A with D on BC. Suppose AC=6cm and the area of the △ADC is 10cm2. Then, the length of BD in cm is equal to

53​

103​

35​

310​

Given, ABC is right angled triangle with B is 90∘. AD is angle bisector of ∠A. ∴ACAB​=DCBD​ ⇒AB⋅CD=BD⋅AC Area of △ADC=10 ⇒21​×AB⋅CD=10 ⇒21​×BD⋅AC=10 →BD=AC20​ ⇒BD=620​[∵AC=6] ⇒BD=310​

Q. Let $A BC$ be a triangle with $∠ B = 9 0^{\circ}$ . Let $A D$ be the bisector of $∠ A$ with $D$ on $BC$ . Suppose $A C = 6 c m$ and the area of the $△ A D C$ is $10 c m^{2}$ . Then, the length of $B D$ in $c m$ is equal to

$\frac{3}{5}$

$\frac{3}{10}$

$\frac{5}{3}$

$\frac{10}{3}$