Question

Question 60 state wether the triangle is an isosceles triangle,right triangle, neither of these or both.

Answer 1

Given:

The points of the triangle:

`P_1=(7,2);P_2=(-4,0);P_3=(4,6)`

Required:

To find out if the given triangle is an equilateral triangle or an isosceles triangle or both or none of these.

Step-by-step explanation:

To find if the triangle is an equilateral triangle or an isosceles triangle we will have to first find the length of the sides by distance formula.

Distance formula is given by:

`d=√((x_2-x_1)_^2+(y_2-y_1)^2)`

So applying the distance formula on side P₁P₂

Substituting the value of P₁ and P₂ in the distance formula we get

`P₁P₂=√((-4-7)^2+(0-2)^2)=√((-11)^2+(-2)^2)=√(121+4)=√(125)=5√(5)`

Now lets find the length of P₂P₃

Substituting the value of P₂ and P₃ in the distance formula we get

`P₂P₃=√((4-(-4))^2+(6-0)^2)=√((4+4)^2+6^2)=√(8^2+6^2)=√(64+36)=√(100)=10`

Now lets find the length of P₁P₃

Substituting the value of P₁ and P₃ in the distance formula we get

`P₁P₃=√((4-7)^2+(6-2)^2)=√((-3)^2+(4)^2)=√(9+16)=√(25)=5`

S now we have the length of all three sides, that is

`\begin{gathered} l(P₁P₂)=5√(5) \\ \\ l(P_2P_3)=10 \\ \\ l(P₁P_3)=5 \end{gathered}`

If we add any two sides of triangle then it is greater than the third side so it is a triangle.

`\begin{gathered} 5√(5)+5>10 \\ 5+10>5√(5) \\ 5√(5)+10>5 \end{gathered}`

So it is a valid triangle. But the length of all the sides of triangle are different.

In equilateral triangle all the sides are same.

In isosceles triangle any sides are same.

Since here none of the sides are same so it is neither an equilateral triangle nor an isosceles triangle. It is a Scalene triangle with all three sides different.

Final answer:

The answer is none of these.