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Since O is inscribed in triangle ABC, you know that AB, AC, and BC are all tangent to the circle. The tangent segments theorem asserts that AD is congruent to A F; BD is congruent to BE; and CF is congruent to CE. (NOTE: E is the point where the circle touches BC - I've taken the liberty of labeling it as such.)

Then the perimeter [tex]P[/tex] of triangle ABC will be twice the sum of the labeled edges:

[tex]P=2(12\,\mathrm{cm}+16\,\mathrm{cm}+6\,\mathrm{cm})=72\,\mathrm{cm}[/tex]

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Answer:

68 cm

Step-by-step explanation:

When you have a circle, and an external point [tex]P[/tex], the two segments [tex]PM[/tex] and [tex]PN[/tex] that are tangent to the circle are congruent always. (See Figure 1).

In this case, we can apply the same theorem three times in you figure! (See figure 2)

[tex] BD = BC =16 [/tex]

[tex] AD = FA =12[/tex]

[tex] CF = CE =6 [/tex]

Then, we can find the size of the sides:

[tex] AB = AD + BD = 12 + 16=28[/tex]

[tex] BC = BE + EC = 16 + 6=22 [/tex]

[tex] CA = CF + FA = 6 + 12=18 [/tex]

Finally, we can find the perimeter that is the sum of the three sides:

[tex] Perimeter = AB + BC + CA = 28 + 22 + 18 = 68 [/tex]

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