90670 DIRECTION: In the following questions, a statement of assertion (A) is followed by a statement of reason (R). Mark the correct choice as:
Assertion: ABCis an isosceles triangle right angled at Cthen AB? = 2AC\(^{2}\)
Reason: If in atriangle, square of one side is equal to the sum of the squares of the other two sides, then the angle opposite the first side is a right angle. Ans. We know that If in a triangle, square of one side is equal to the sum of the.

90671 In \(\triangle\text{ABC} \) it is given that \(\frac{\text{AB}}{\text{AC}}=\frac{\text{BD}}{\text{DC}}. \) If \(\angle\text{B}=70^\circ \) and \(\angle\text{C}=50^\circ \) then \(\angle\text{BAD}=? \)

90672 Choose the correct answer from the given four options:
It is given that \(\triangle\text{ABC}\sim\triangle\text{DEF},\ \angle\text{A}=30^\circ,\ \angle\text{C}=50^\circ, \) AB = 5cm, AC = 8cm, and DF = 7.5cm Then, the following is true:

90673 In \(\triangle\text{ABC},\text{DE }||\text{ BC} \) such that \(\frac{\text{AD}}{\text{DB}}=\frac{3}{5}. \) AC = 5.6cm then AE =?

90670 DIRECTION: In the following questions, a statement of assertion (A) is followed by a statement of reason (R). Mark the correct choice as:
Assertion: ABCis an isosceles triangle right angled at Cthen AB? = 2AC\(^{2}\)
Reason: If in atriangle, square of one side is equal to the sum of the squares of the other two sides, then the angle opposite the first side is a right angle. Ans. We know that If in a triangle, square of one side is equal to the sum of the.

90671 In \(\triangle\text{ABC} \) it is given that \(\frac{\text{AB}}{\text{AC}}=\frac{\text{BD}}{\text{DC}}. \) If \(\angle\text{B}=70^\circ \) and \(\angle\text{C}=50^\circ \) then \(\angle\text{BAD}=? \)

90672 Choose the correct answer from the given four options:
It is given that \(\triangle\text{ABC}\sim\triangle\text{DEF},\ \angle\text{A}=30^\circ,\ \angle\text{C}=50^\circ, \) AB = 5cm, AC = 8cm, and DF = 7.5cm Then, the following is true:

90673 In \(\triangle\text{ABC},\text{DE }||\text{ BC} \) such that \(\frac{\text{AD}}{\text{DB}}=\frac{3}{5}. \) AC = 5.6cm then AE =?

90670 DIRECTION: In the following questions, a statement of assertion (A) is followed by a statement of reason (R). Mark the correct choice as:
Assertion: ABCis an isosceles triangle right angled at Cthen AB? = 2AC\(^{2}\)
Reason: If in atriangle, square of one side is equal to the sum of the squares of the other two sides, then the angle opposite the first side is a right angle. Ans. We know that If in a triangle, square of one side is equal to the sum of the.

90671 In \(\triangle\text{ABC} \) it is given that \(\frac{\text{AB}}{\text{AC}}=\frac{\text{BD}}{\text{DC}}. \) If \(\angle\text{B}=70^\circ \) and \(\angle\text{C}=50^\circ \) then \(\angle\text{BAD}=? \)

90672 Choose the correct answer from the given four options:
It is given that \(\triangle\text{ABC}\sim\triangle\text{DEF},\ \angle\text{A}=30^\circ,\ \angle\text{C}=50^\circ, \) AB = 5cm, AC = 8cm, and DF = 7.5cm Then, the following is true:

90673 In \(\triangle\text{ABC},\text{DE }||\text{ BC} \) such that \(\frac{\text{AD}}{\text{DB}}=\frac{3}{5}. \) AC = 5.6cm then AE =?

90670 DIRECTION: In the following questions, a statement of assertion (A) is followed by a statement of reason (R). Mark the correct choice as:
Assertion: ABCis an isosceles triangle right angled at Cthen AB? = 2AC\(^{2}\)
Reason: If in atriangle, square of one side is equal to the sum of the squares of the other two sides, then the angle opposite the first side is a right angle. Ans. We know that If in a triangle, square of one side is equal to the sum of the.

90671 In \(\triangle\text{ABC} \) it is given that \(\frac{\text{AB}}{\text{AC}}=\frac{\text{BD}}{\text{DC}}. \) If \(\angle\text{B}=70^\circ \) and \(\angle\text{C}=50^\circ \) then \(\angle\text{BAD}=? \)

90672 Choose the correct answer from the given four options:
It is given that \(\triangle\text{ABC}\sim\triangle\text{DEF},\ \angle\text{A}=30^\circ,\ \angle\text{C}=50^\circ, \) AB = 5cm, AC = 8cm, and DF = 7.5cm Then, the following is true:

90673 In \(\triangle\text{ABC},\text{DE }||\text{ BC} \) such that \(\frac{\text{AD}}{\text{DB}}=\frac{3}{5}. \) AC = 5.6cm then AE =?