The altitude of the equilateral triangle of side a units is : 1. units 2. units 3. units 4. units

In △ ABC, AB = BC = AC = a units Draw altitude AD perpendicular to BC. In an equilateral triangle, the altitude also acts as the median (bisecting the base). ∴ BD = In right angled △ABD, Using Pythagoras theorem, Hypotenuse2 = Perpendicular2 + Base2 ⇒ AB2 = AD2 + BD2 Hence, option 1 is the correct option.

Mathematics

The altitude of the equilateral triangle of side a units is :
$\dfrac{\text{a} \sqrt{3}}{2}$ units
$\dfrac{\sqrt{3 \text{a}}}{2}$ units
$\dfrac{\sqrt{2 \text{a}}}{2}$ units
$\dfrac{3 \text{a}}{2}$ units

Pythagoras Theorem

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Answer

Find the altitude of an equilateral triangle of side 5. Pythagoras Theorem, R.S. Aggarwal Mathematics Solutions ICSE Class 9.

In △ ABC,

AB = BC = AC = a units

Draw altitude AD perpendicular to BC.

In an equilateral triangle, the altitude also acts as the median (bisecting the base).

∴ BD = $\dfrac{1}{2} \times BC = \dfrac{1}{2} \times a = \dfrac{\text{a}}{2}$

In right angled △ABD,

Using Pythagoras theorem,

Hypotenuse² = Perpendicular² + Base²

⇒ AB² = AD² + BD²

$\Rightarrow \text{a}^2 = \text{AD}^2 + \Big(\dfrac{\text{a}}{2}\Big)^2 \\[1em] \Rightarrow \text{AD}^2 = \text{a}^2 - \dfrac{\text{a}^2}{4} \\[1em] \Rightarrow \text{AD}^2 = \dfrac{4\text{a}^2 - \text{a}^2}{4} \\[1em] \Rightarrow \text{AD}^2 = \dfrac{3\text{a}^2}{4} \\[1em] \Rightarrow \text{AD} = \sqrt{\dfrac{3\text{a}^2}{4}} \\[1em] \Rightarrow \text{AD} = \dfrac{\text{a} \sqrt{3}}{2} \text{ units.}$

Hence, option 1 is the correct option.

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Mathematics

The altitude of the equilateral triangle of side a units is :
$\dfrac{\text{a} \sqrt{3}}{2}$ units
$\dfrac{\sqrt{3 \text{a}}}{2}$ units
$\dfrac{\sqrt{2 \text{a}}}{2}$ units
$\dfrac{3 \text{a}}{2}$ units

Pythagoras Theorem

Answer

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The altitude of the equilateral triangle of side a units is :
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$\dfrac{\sqrt{3 \text{a}}}{2}$ units
$\dfrac{\sqrt{2 \text{a}}}{2}$ units
$\dfrac{3 \text{a}}{2}$ units

The diagonals AC and BD of a rhombus ABCD are of lengths 6 cm and 8 cm. The length of each side of the rhombus is :
3 cm
5 cm
7 cm
9 cm

The lengths of the adjacent sides of the right angle of a right-angled triangle are (x - 2) cm and $2\sqrt{2}x$ cm. If the length of the hypotenuse is 3 cm, then the value of x is :
1
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ABD is a right-angled triangle, whose ∠D is the right angle. C is any point on the side BD. If AB = 8 cm, BC = 6 cm and AC = 3 cm, then the length of CD is :
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