Respuesta :
Answer:
Every hour, the number of people who yawn in Gottfried's experiment grows by a factor of 5.89
Step-by-step explanation:
Understanding the problem
The expression for P_{\text{minute}}(t)P
minute
(t)P, start subscript, start text, m, i, n, u, t, e, end text, end subscript, left parenthesis, t, right parenthesis, the number of people who yawn in Gottfried's experiment after ttt minutes, is 5⋅(1.03)t. This means that every minute, the number of people who yawn in Gottfried's experiment grows by a factor of 1.031.031, point, 03.
Let's change this expression so that the base tells us by which factor the number of people who yawn in Gottfried's experiment grows every hour.
Hint #22 / 3
Changing the unit
We want to find the expression for P_{\text{hour}}(x)P
hour
(x)P, start subscript, start text, h, o, u, r, end text, end subscript, left parenthesis, x, right parenthesis, which models the number of people who yawn in Gottfried's experiment after xxx hours.
NOTE: The function P_{\text{hour}}P
hour
P, start subscript, start text, h, o, u, r, end text, end subscript is not equivalent to P_{\text{minute}}P
minute
P, start subscript, start text, m, i, n, u, t, e, end text, end subscript, although they model the same situation. [Tell me more.]
P_{\text{hour}}
P, start subscript, start text, h, o, u, r, end text, end subscriptP_{\text{minute}}
P, start subscript, start text, m, i, n, u, t, e, end text, end subscript
P_{\text{hour}}(1)
P, start subscript, start text, h, o, u, r, end text, end subscript, left parenthesis, 1, right parenthesis11P_{\text{minute}}(1)
P, start subscript, start text, m, i, n, u, t, e, end text, end subscript, left parenthesis, 1, right parenthesis11
Since there are \blueD{60}60start color #11accd, 60, end color #11accd minutes in an hour, t=\blueD{60}xt=60xt, equals, start color #11accd, 60, end color #11accd, x, and the expression for P_{\text{hour}}(x)P
hour
(x)P, start subscript, start text, h, o, u, r, end text, end subscript, left parenthesis, x, right parenthesis is the same as the following expression.
Pminute(60x)=5⋅(1.03)60x=5⋅((1.03)60)x
Evaluating \maroonC{(1.03)^{60}}(1.03)
60
start color #ed5fa6, left parenthesis, 1, point, 03, right parenthesis, start superscript, 60, end superscript, end color #ed5fa6 and rounding to two decimal places, we find that Phour(x)=5⋅(5.89)x.
Every hour, the number of people who yawn in Gottfried's experiment grows by a factor of 5.89.
What is an exponent?
Let b is the base and x is the power of the exponent function and a is the leading coefficient. The exponent is given as,
y = a(b)ˣ
Gottfried wanted to see how contagious yawning can be.
To better understand this, he conducted a social experiment by yawning in front of a random large crowd and observing how many people yawned as a result.
The function is given as,
[tex]\rm P(t)=5\cdot(1.03)^t[/tex]
Where, t is in minutes.
1 hour = 60 minutes
t hours = 60t minutes
Then the equation will be
[tex]\rm P(t)=5\cdot(1.03)^{60t}\\\\\rm P(t)=5\cdot(5.89)^t\\[/tex]
Every hour, the number of people who yawn in Gottfried's experiment grows by a factor of 5.89.
More about the exponent link is given below.
https://brainly.com/question/5497425
#SPJ2
