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Chapter 2: Problem 17

Find a function \(s\) such that \(s(d)\) is the number of seconds in \(d\) days.

Short Answer

Expert verified
The function \(s(d)\) that calculates the number of seconds in \(d\) days is defined as \(s(d) = 86,400 \times d\).

Step by step solution

01

Find the number of seconds in a minute

There are 60 seconds in a minute.
02

Find the number of seconds in an hour

There are 60 minutes in an hour. To find the number of seconds in an hour, we multiply the number of seconds in a minute by the number of minutes in an hour: \(60 \text{ seconds} \times 60 \text{ minutes} = 3600 \text{ seconds}\)
03

Find the number of seconds in a day

There are 24 hours in a day. To find the number of seconds in a day, we multiply the number of seconds in an hour by the number of hours in a day: \(3600 \text{ seconds} \times 24 \text{ hours} = 86,400 \text{ seconds}\)
04

Define the function s(d)

Now that we know there are 86,400 seconds in a day, we can define the function s(d) that calculates the number of seconds in d days. We simply multiply the number of days by the number of seconds in a day (86,400): \(s(d) = 86,400 \times d\) The function s(d) is now defined to calculate the number of seconds in d days.

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Most popular questions from this chapter

Write the indicated expression as a ratio of polynomials, assuming that $$ r(x)=\frac{3 x+4}{x^{2}+1}, \quad s(x)=\frac{x^{2}+2}{2 x-1}, \quad t(x)=\frac{5}{4 x^{3}+3} $$. $$ (s(x))^{2} $$

Find a polynomial \(p\) of degree 3 such that \(-2,-1,\) and 4 are zeros of \(p\) and \(p(1)=2\).

Write the indicated expression as \(a\) polynomial. $$ (p(x))^{2} $$

Verify that \(x^{3}-y^{3}=(x-y)\left(x^{2}+x y+y^{2}\right)\).

Write the indicated expression as a ratio of polynomials, assuming that $$ r(x)=\frac{3 x+4}{x^{2}+1}, \quad s(x)=\frac{x^{2}+2}{2 x-1}, \quad t(x)=\frac{5}{4 x^{3}+3} $$. $$ (r \circ t)(x) $$
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