Solve the problem.The value of a certain baseball card is modeled by
where V(t) is the value in dollars t years after the baseball card was printed. Find the second approximating polynomial, P2(t), centered at
, and use it to predict the value of the card 53 years after it came out.
A. P2(t) = 4475.7568 + 4475.7568(t - 48) + 559.4696(t - 48)2
P2(53) = $15,665.15
B. P2(t) = 4475.7568 + 1118.9392(t - 48) + 139.8674(t - 48)2
P2(53) = $7273.10
C. P2(t) = 17,903.027 + 4475.7568(t - 48) + 559.4696(t - 48)2;
P2(53) = $54,268.55
D. P2(t) = 17,903.027 + 4475.7568(t - 48) + 1118.9392(t - 48)2
P2(53) = $31,330.30
Answer: C
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A. $146.75 B. $145.65 C. $145.75 D. $145.66
Find the difference.69 - (-78)
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Determine if the function is a power function. If it is, then state the power and constant of variation.f(x) = x5
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D. Power is ; constant of variation is 5
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