To create an area that is 1.5 m^2 in size, you will need to make use of a total of 27 triangles.
<h3>How many triangles are needed to compose a region that is 1.5 square meters?</h3>
A square that has a size of one square meter is divided into nine smaller squares that are similar to each other. Each of the little squares is divided into two triangles that are similar to one another.
There are nine smaller squares contained inside one square meter, since 1 square meter may be broken down into nine identical smaller squares. Each of the little squares is divided into two triangles that are similar to one another. 9 smaller squares may be broken down into the following:
9*2=18 (shows identical triangles)
Hence, 1 square meter is decomposed into 18 identical triangles.
We need to find the number of triangles needed to compose a region that is square meters
where
m^2 = 1.5 m^2
Where
1 m^2 = 18 identical triangles.
1.5 m^2 = 1.5 * 18
1.5 m^2 = 27 identical triangles.
In conclusion, To create an area that is 1.5 m^2 in size, you will need to make use of a total of 27 triangles.
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Step-by-step explanation:
3km 650m = 3650m
3650 × 10 = 36500m = 36km 500m
3(-5) + 4(2)
= -15 + 8
= -7
Answer:
A, C, F.
Step-by-step explanation:
A polynomial consists of an expression that involves only non-negative integer exponents for the variable; in all of your cases, the variable is x.
So, expression A has a square root of x, that is a rational exponent.
Expression C has variables in the denominators, that is negative exponent.
Expression F has variable at the exponent.
From SOH CAH TOA, you know that
cos(72°) = 6/x
x = 6/cos(72°) ≈ 6/0.309017
x ≈ 19.42
