Check wheather the followingsides are right angled trianglesusing Phythagoras Theoras12, 13, 15 About the author Camila
Answer: Mark me as a Brainlist plz Step-by-step explanation: Longest side is hypotenuse so here the longest side is 15 cm Let adjacent side be 13 and opposite side be 12 According to Pythagoras theorem :- [tex] {(opp)}^{2} + {(adj)}^{2} = {(hyp)}^{2} \\ = > {(12)}^{2} + {(13)}^{2} = {(15)}^{2} \\ = > 144 + 169 = 225 \\ = > 313≠225[/tex] so the given triplets are not the sides of a right angled triangle. Because they don’t satisfy the Pythagoras theorem Reply
Answer: No, these are not sides of a right triangle. Step-by-step explanation: In Right Triangle, h² = b²+ p² A/Q, h = 15, b = 13 & p = 12 15² = 13² + 12² => 225 = 169 + 144 => 225 = 313 LHS is not equal to RHS. HENCE, 12, 13, 15 cannot be sides of a right triangle because it does not follow Pythagorous theorem. Reply
Answer:
Mark me as a Brainlist plz
Step-by-step explanation:
Longest side is hypotenuse so here the longest side is 15 cm
Let
adjacent side be 13
and
opposite side be 12
According to Pythagoras theorem :-
[tex] {(opp)}^{2} + {(adj)}^{2} = {(hyp)}^{2} \\ = > {(12)}^{2} + {(13)}^{2} = {(15)}^{2} \\ = > 144 + 169 = 225 \\ = > 313≠225[/tex]
so the given triplets are not the sides of a right angled triangle. Because they don’t satisfy the Pythagoras theorem
Answer:
No, these are not sides of a right triangle.
Step-by-step explanation:
In Right Triangle,
h² = b²+ p²
A/Q, h = 15, b = 13 & p = 12
15² = 13² + 12²
=> 225 = 169 + 144
=> 225 = 313
LHS is not equal to RHS.
HENCE, 12, 13, 15 cannot be sides of a right triangle because it does not follow Pythagorous theorem.