Math, asked by janajaivid3461, 9 months ago

Are two triangles in the figure similar according to the information given if yes by which test

Answers

Answered by Kaushikm
3

Answer:

Two triangles are similar if they have:

all their angles equal

corresponding sides are in the same ratio

But we don't need to know all three sides and all three angles ...two or three out of the six is usually enough.

There are three ways to find if two triangles are similar: AA, SAS and SSS:

AA

AA stands for "angle, angle" and means that the triangles have two of their angles equal.

If two triangles have two of their angles equal, the triangles are similar.

Example: these two triangles are similar:

triangles similar both have angles 72 and 35

If two of their angles are equal, then the third angle must also be equal, because angles of a triangle always add to make 180°.

In this case the missing angle is 180° − (72° + 35°) = 73°

So AA could also be called AAA (because when two angles are equal, all three angles must be equal).

SAS

SAS stands for "side, angle, side" and means that we have two triangles where:

the ratio between two sides is the same as the ratio between another two sides

and we we also know the included angles are equal.

If two triangles have two pairs of sides in the same ratio and the included angles are also equal, then the triangles are similar.

Example:

triangles similar both have angle 75 but sides (15,21,a) and (10,14,x)

In this example we can see that:

one pair of sides is in the ratio of 21 : 14 = 3 : 2

another pair of sides is in the ratio of 15 : 10 = 3 : 2

there is a matching angle of 75° in between them

So there is enough information to tell us that the two triangles are similar.

Using Trigonometry

We could also use Trigonometry to calculate the other two sides using the Law of Cosines:

Example Continued

In Triangle ABC:

a2 = b2 + c2 - 2bc cos A

a2 = 212 + 152 - 2 × 21 × 15 × Cos75°

a2 = 441 + 225 - 630 × 0.2588...

a2 = 666 - 163.055...

a2 = 502.944...

So a = √502.94 = 22.426...

In Triangle XYZ:

x2 = y2 + z2 - 2yz cos X

x2 = 142 + 102 - 2 × 14 × 10 × Cos75°

x2 = 196 + 100 - 280 × 0.2588...

x2 = 296 - 72.469...

x2 = 223.530...

So x = √223.530... = 14.950...

Now let us check the ratio of those two sides:

a : x = 22.426... : 14.950... = 3 : 2

the same ratio as before!

Note: we can also use the Law of Sines to show that the other two angles are equal.

SSS

SSS stands for "side, side, side" and means that we have two triangles with all three pairs of corresponding sides in the same ratio.

If two triangles have three pairs of sides in the same ratio, then the triangles are similar.

Example:

triangles (4,6,8) and (5,7.5,10)

In this example, the ratios of sides are:

a : x = 6 : 7.5 = 12 : 15 = 4 : 5

b : y = 8 : 10 = 4 : 5

c : z = 4 : 5

These ratios are all equal, so the two triangles are similar.

Using Trigonometry

Using Trigonometry we can show that the two triangles have equal angles by using the Law of Cosines in each triangle:

In Triangle ABC:

cos A = (b2 + c2 - a2)/2bc

cos A = (82 + 42 - 62)/(2× 8 × 4)

cos A = (64 + 16 - 36)/64

cos A = 44/64

cos A = 0.6875

So Angle A = 46.6°

In Triangle XYZ:

cos X = (y2 + z2 - x2)/2yz

cos X = (102 + 52 - 7.52)/(2× 10 × 5)

cos X = (100 + 25 - 56.25)/100

cos X = 68.75/100

cos X = 0.6875

So Angle X = 46.6°

So angles A and X are equal!

Step-by-step explanation:

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