Let l 0 be a real number,C denote a circle | vedclass

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(A) Given the circumference of circle $C$ is $l$,we have $2 \pi r = l$,which implies $r = \frac{l}{2 \pi}$.Thus,the area of circle $C$ is $A_C = \pi r

Vedclass · Accepted Answer

given any positive real number $\alpha$,we can choose $C$ and $T$ as above such that the ratio $\frac{\operatorname{Area}(C)}{\operatorname{Area}(T)}$ is greater than $\alpha$

Vedclass · Answer

(A) Given the circumference of circle $C$ is $l$,we have $2 \pi r = l$,which implies $r = \frac{l}{2 \pi}$.Thus,the area of circle $C$ is $A_C = \pi r^2 = \frac{l^2}{4 \pi}$.For a triangle $T$ with perimeter $l$,the area $A_T$ can be arbitrarily small by choosing a very thin triangle (e.g.,sides $\frac{l}{2}-\epsilon, \frac{l}{2}-\epsilon, 2\epsilon$).Since $A_C$ is fixed for a given $l$ and $A_T$ can be made arbitrarily close to $0$,the ratio $\frac{A_C}{A_T}$ can be made arbitrarily large.Therefore,for any positive real number $\alpha$,we can choose $T$ such that $\frac{\operatorname{Area}(C)}{\operatorname{Area}(T)} > \alpha$.

Let $l > 0$ be a real number,$C$ denote a circle with circumference $l$,and $T$ denote a triangle with perimeter $l$. Then:

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