In A ABC, AB= AC = 15 cm. , BC = 18 cm. find cos < ABC.2(a)2/5(b) 4/5(c)1/5 (d)3/5 About the author Eloise
Answer: Here ABC is a triangle in which AB = 15 cm, AC = 15 cm and BC = 18 cm Draw AD perpendicular to BC, D is mid-point of BC. Then, BD = DC = 9 cm in right angled triangle ABD, By Pythagoras theorem, we get AB^2 = AD^2 + BD^2 putting the respective values, we get AD = 12 cm (i) cos ∠ ABC = Base/ Hypotenuse (In right angled ΔABD,∠ABC=∠ABD) = BD / AB = 9/15 = 3/5 (ii) sin ∠ACB=sin∠ACD = perpendicular/ Hypotenuse = AD/AC = 12/15 = 4/5 Step-by-step explanation: thank❤ you Reply
Answer: option d Step-by-step explanation: AB = AC = 15 cm BC = 18 cm it is an isosceles triangle if we draw AD ⊥ from A to line BC it will bisect BC so BD = 18/2 = 9 cm Δ ABD will be right angle triangle with Base BD – 9 cm & Hypotenuse = AB = 15 cm ∠ABD = ∠ABC ( as D is a point on line BC) Cos∠ABC = 9/15 => Cos∠ABC = 3/5 => Cos∠ABC = 0.6 Reply
Answer:
Here ABC is a triangle in which
AB = 15 cm, AC = 15 cm and BC = 18 cm
Draw AD perpendicular to BC, D is mid-point of BC.
Then, BD = DC = 9 cm
in right angled triangle ABD,
By Pythagoras theorem, we get
AB^2 = AD^2 + BD^2
putting the respective values, we get
AD = 12 cm
(i) cos ∠ ABC = Base/ Hypotenuse
(In right angled ΔABD,∠ABC=∠ABD)
= BD / AB
= 9/15
= 3/5
(ii) sin ∠ACB=sin∠ACD
= perpendicular/ Hypotenuse
= AD/AC
= 12/15
= 4/5
Step-by-step explanation:
thank❤ you
Answer:
option d
Step-by-step explanation:
AB = AC = 15 cm
BC = 18 cm
it is an isosceles triangle
if we draw AD ⊥ from A to line BC
it will bisect BC so BD = 18/2 = 9 cm
Δ ABD will be right angle triangle
with Base BD – 9 cm & Hypotenuse = AB = 15 cm
∠ABD = ∠ABC ( as D is a point on line BC)
Cos∠ABC = 9/15
=> Cos∠ABC = 3/5
=> Cos∠ABC = 0.6