What is the area of a triangle base=2 height =4, but its NOT a right triangle?

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What is the area of a triangle base=2 height =4, but its NOT a right triangle?

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Answer 1 · 2015-07-23T23:13:43

Area of a triangle is $1/2 xx base xx height$
(there is no requirement that the triangle be a right triangle for this formula)
The given triangle has an area of 4

Explanation:

Only continue if you don't understand why
$color(white)("XXXX")$ $"Area"_"triangle" = 1/2xx"base"xx"height"$

Consider the two triangles below:
enter image source here
For the Acute Angled Triangle ABC
$triangle ABC$ is composed of $triangle ADC$ and $triangle DBC$

$triangle ADC = 1/2 square ADCP$
$triangle DBC = 1/2 square DBRC$

$triangle ABC$
$color(white)("XXXX")$ $= 1/2 (square ADCP + square DBRC)$

$color(white)("XXXX")$ $= 1/2 (square ABRP)$

and since the Area of $square ABRP = "base"xx"height"$

$color(white)("XXXX")$ Area of $triangle ABC = 1/2 xx "base" xx "height"$

For the Obtuse Angled Triangle ABC
following a similar argument:
$triangle ADC = 1/2(square ADCP) = 1/2 ("base" + x) xx "height"$

$triangle BDC = 1/2(square BDCR) = 1/2 x xx "height"$

$triangle ABC = triangle ADC - triangle BDC$

Area of $triangle ABC$
$color(white)("XXXX")$ $= [ 1/2("base"+x)xx "height"] - [1/2[x xx "height"]$

$color(white)("XXXX")$ $= 1/2 "base" xx "height"$

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What is the area of a triangle base=2 height =4, but its NOT a right triangle?

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