∆XYZ is a right-angled triangle, right angled at Y and YO is perpendicular to XYZ. Find the area of∆XYZ and the length of Yo if XY = 8 cm and YZ = 6 cm
Answers
HI BROTHER AND SISTER HERE IS YOUR ANSWER :-
In right angled triangle yxz (angle x=90°) :- (xy)^2+(xz)^2= (yz)^2.
In right angled triangle yxz (angle x=90°) :- (xy)^2+(xz)^2= (yz)^2.or. (9)^2+(xz)^2=(12)^2.
In right angled triangle yxz (angle x=90°) :- (xy)^2+(xz)^2= (yz)^2.or. (9)^2+(xz)^2=(12)^2.or. (xz)^2= 144–81=63.
In right angled triangle yxz (angle x=90°) :- (xy)^2+(xz)^2= (yz)^2.or. (9)^2+(xz)^2=(12)^2.or. (xz)^2= 144–81=63.Or. xz = 3√7 cm.
In right angled triangle yxz (angle x=90°) :- (xy)^2+(xz)^2= (yz)^2.or. (9)^2+(xz)^2=(12)^2.or. (xz)^2= 144–81=63.Or. xz = 3√7 cm.Area of right angled triangle yxz= 1/2. (xy)×(xz)………………….(1)
In right angled triangle yxz (angle x=90°) :- (xy)^2+(xz)^2= (yz)^2.or. (9)^2+(xz)^2=(12)^2.or. (xz)^2= 144–81=63.Or. xz = 3√7 cm.Area of right angled triangle yxz= 1/2. (xy)×(xz)………………….(1)Also area of right angled triangle yxz = 1/2.(ox)×(yz)………………………(2).
In right angled triangle yxz (angle x=90°) :- (xy)^2+(xz)^2= (yz)^2.or. (9)^2+(xz)^2=(12)^2.or. (xz)^2= 144–81=63.Or. xz = 3√7 cm.Area of right angled triangle yxz= 1/2. (xy)×(xz)………………….(1)Also area of right angled triangle yxz = 1/2.(ox)×(yz)………………………(2).from eqn. (1) and (2)
In right angled triangle yxz (angle x=90°) :- (xy)^2+(xz)^2= (yz)^2.or. (9)^2+(xz)^2=(12)^2.or. (xz)^2= 144–81=63.Or. xz = 3√7 cm.Area of right angled triangle yxz= 1/2. (xy)×(xz)………………….(1)Also area of right angled triangle yxz = 1/2.(ox)×(yz)………………………(2).from eqn. (1) and (2)1/2.(ox)×(yz) =1/2.(xy)×(xz).
In right angled triangle yxz (angle x=90°) :- (xy)^2+(xz)^2= (yz)^2.or. (9)^2+(xz)^2=(12)^2.or. (xz)^2= 144–81=63.Or. xz = 3√7 cm.Area of right angled triangle yxz= 1/2. (xy)×(xz)………………….(1)Also area of right angled triangle yxz = 1/2.(ox)×(yz)………………………(2).from eqn. (1) and (2)1/2.(ox)×(yz) =1/2.(xy)×(xz).or. ox = (xy)×(xz)/(yz). = (9×3√7)/(12) = 9√7/4= 5.95 cms.
Answer.
I HOPE I HAVE HELP YOU IN THIS QUESTION.
PLEASE CHECK MY BIO AND FOLLOW ME AND MARK ME AS BRAINLEAST AND THANKS.
Answer:
yes she
Step-by-step explanation:
has written it correctly