Solve the problem.
-The temperature in Fairbanks is approximated by
$$T ( x ) = 37 \sin \left[ \frac { 2 \pi } { 365 } ( x - 101 ) \right] + 25$$
where $\mathrm { T } ( \mathrm { x } )$ is the temperature on day $\mathrm { x }$, with $\mathrm { x } = 1$ corresponding to Jan. 1 and $\mathrm { x } = 365$ corresponding to Dec. 31. Estimate the temperature on day 230 .
A) $54 ^ { \circ }$
B) $- 25 ^ { \circ }$
C) $284 ^ { \circ }$
D) $29 ^ { \circ }$

Question

Quizplus · Accepted Answer

To estimate the temperature on day 230, substitute $x = 230$ into the given equation: $T(230) = 37 \sin\left[\frac{2\pi}{365}(230 - 101)\right] + 25$. Calculating the sine value and then multiplying by 37 and adding 25 gives a result close to 54 degrees, making choice A correct.

Solve the Problem T(x)=37sin⁡[2π365(x−101)]+25T ( x ) = 37 \sin \left[ \frac { 2 \pi } { 365 } ( x - 101 ) \right] + 25T(x)=37sin[3652π​(x−101)]+25

Solve the Problem $T ( x ) = 37 \sin \left[ \frac { 2 \pi } { 365 } ( x - 101 ) \right] + 25$