Answer:
28.13 cm
Step-by-step explanation:
The first step we need to do is create the segment AC.
Then, we can find its length using the law of cosines in the triangle ABC:
b^2 = a^2 + c^2 - 2*a*c*cos(B)
b^2 = 8^2 + 6^2 - 2*8*6*cos(95)
b^2 = 64 + 36 - 96*(-0.0872)
b^2 = 108.37
b = 10.41 cm
Then, in the triangle ADC, we can use the Pythagoras' theorem to find the length of DC:
DC^2 + DA^2 = AC^2
DC^2 + 25 = 108.37
DC^2 = 83.37
DC = 9.13 cm
So the perimeter of ABCD is:
Perimeter = AB + BC + CD + DA
Perimeter = 6 + 8 + 9.13 + 5 = 28.13 cm
Answer:
The perimeter of the shape is 28.13 cm
Step-by-step explanation:
First of all, we will have to draw a line from point A to point C. This will divide the shape into two parts, both of which are triangles.
We will use the dimensions of the newly formed triangle ABC to get the side AC.
The cosine formula will be apt for this purpose:
[tex]AC^{2}=AB^{2}+BC^{2}-(2 \times AB\times BC\times cos \theta)[/tex]
[tex]AC^{2}=6^{2}+8^{2}-(2 \times 6\times 8\times cos( 95))=108.37[/tex]
[tex]AC=\sqrt{108.37}=10.41 cm[/tex]
Now we have AC as 10.41 cm,
we can see that AC forms the hypothenuse of the right-angled triangle ADC.
From Pythagoras' theorem, DC can be calculated as
[tex]DC =\sqrt{AC^{2}- AD^{2}}[/tex]
[tex]DC =\sqrt{10.41^{2}- 5^{2}}= 9.13 cm[/tex]
Therefore the perimeter of the shape is 8 + 5 + 9.13 + 6 =28.13 cm
The perimeter of the shape is 28.13 cm
