Question

The areaof a triangle is 216 cm².One side of the triangle measure 24cm.Find the distance of the corresponding vertex from the side.​

Answer 1

Answer:

The distance of corresponding vertex from the side = 18 cm

Step-by-step explanation:

given: one side of the triangle=24cm.

the area of triangle=216sq.cm

the distance of the corresponding vertex from the side =height of the triangle (h).

we know: area of triangle=1/2bh where b is base and h is height.

1/2bh=216

24h=216×2

h=216×2/24

h=18cm

Answer 2

GIVEN :-

area of triangle = 216 cm²

base of triangle = 24 cm

TO FIND :-

height of triangle ( distance of the corresponding vertex from the side.)

SOLUTION :-

we know that the area of triangle

$\implies \boxed{ \rm{area \: of \: \triangle \: = \dfrac{1}{2} \times base \times hieght \: }}</p><p></p><p></p><p>$

so ,

$\implies \rm{ 216 \: = \: \dfrac{1}{2} \times 24 \times h}$

$\implies \rm{ 216 \: = \: 12 \times h}$

$\implies \rm{ h = \dfrac{216}{12} }$

$\implies \boxed { \boxed {\rm{ h = 18 cm }}}$

OTHER INFORMATION

Properties of triangles:

• If two triangles are similar, ratios of sides = ratio of heights = ratio of medians = ratio of angle bisectors = ratio of inradii = ratio of circum radii.

• Ratio of areas = b1h1/b2h2 = (s1)2/(s2)2 , where b1& h1 are the base & height of first triangle and b2& h2 are the base & height of second triangle. s1& s2 are the corresponding sides of first and second triangle respectively.

• The two triangles on each side of the perpendicular drawn from the vertex of the right angle to the largest side i.e. Hypotenuse are similar to each other & also similar to the larger triangle.