Math / Algebra

QuestionQuestion 4 (1 point) The function below is a blood pressure model that describes a person's blood pressure in mm Hg as a function of time in seconds. $P(t)=15 \sin \left(\frac{13 \pi}{6} t\right)+110$
What is this person's heart rate in beats per minute? A bpm What is this person's maximum blood pressure? $\square$ $\underbrace{}_{\mathrm{mmHg}}$
What is this person's minimum blood pressure? $\square$ A) mmHg

Studdy Solution

STEP 1

1. The function $P(t) = 15 \sin \left(\frac{13 \pi}{6} t\right) + 110$ models blood pressure as a sinusoidal function.
2. The heart rate in beats per minute (bpm) can be determined from the period of the sine function.
3. The maximum and minimum blood pressure values can be determined from the amplitude and vertical shift of the sine function.

STEP 2

1. Determine the period of the sine function to find the heart rate.
2. Calculate the maximum blood pressure.
3. Calculate the minimum blood pressure.

STEP 3

To find the heart rate, we need to determine the period of the sine function. The general form of a sine function is $a \sin(b t + c) + d$ , where the period is given by $\frac{2\pi}{b}$ .
For the function $P(t) = 15 \sin \left(\frac{13 \pi}{6} t\right) + 110$ , the coefficient $b$ is $\frac{13 \pi}{6}$ .

STEP 4

Calculate the period using the formula:
$\text{Period} = \frac{2\pi}{\frac{13\pi}{6}} = \frac{2\pi \times 6}{13\pi} = \frac{12}{13}$
This period is in seconds per beat.

STEP 5

Convert the period from seconds per beat to beats per minute (bpm). There are 60 seconds in a minute, so:
$\text{Heart Rate (bpm)} = \frac{60}{\frac{12}{13}} = 60 \times \frac{13}{12} = 65$

STEP 6

The maximum blood pressure occurs at the maximum value of the sine function, which is 1. The function is:
$P(t) = 15 \sin \left(\frac{13 \pi}{6} t\right) + 110$
The maximum value of $\sin \left(\frac{13 \pi}{6} t\right)$ is 1, so:
$\text{Maximum Pressure} = 15 \times 1 + 110 = 125$

STEP 7

The minimum blood pressure occurs at the minimum value of the sine function, which is -1. The function is:
$P(t) = 15 \sin \left(\frac{13 \pi}{6} t\right) + 110$
The minimum value of $\sin \left(\frac{13 \pi}{6} t\right)$ is -1, so:
$\text{Minimum Pressure} = 15 \times (-1) + 110 = 95$
The person's heart rate is $\boxed{65}$ bpm, the maximum blood pressure is $\boxed{125}$ mmHg, and the minimum blood pressure is $\boxed{95}$ mmHg.

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Studdy Solution

STEP 1

STEP 2

1. Determine the period of the sine function to find the heart rate.
2. Calculate the maximum blood pressure.
3. Calculate the minimum blood pressure.

STEP 3

STEP 4

Calculate the period using the formula:
$\text{Period} = \frac{2\pi}{\frac{13\pi}{6}} = \frac{2\pi \times 6}{13\pi} = \frac{12}{13}$
This period is in seconds per beat.

STEP 5

Convert the period from seconds per beat to beats per minute (bpm). There are 60 seconds in a minute, so:
$\text{Heart Rate (bpm)} = \frac{60}{\frac{12}{13}} = 60 \times \frac{13}{12} = 65$

STEP 6

The maximum blood pressure occurs at the maximum value of the sine function, which is 1. The function is:
$P(t) = 15 \sin \left(\frac{13 \pi}{6} t\right) + 110$
The maximum value of $\sin \left(\frac{13 \pi}{6} t\right)$ is 1, so:
$\text{Maximum Pressure} = 15 \times 1 + 110 = 125$

STEP 7

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Studdy Solution

STEP 1

STEP 2

1. Determine the period of the sine function to find the heart rate.2. Calculate the maximum blood pressure.3. Calculate the minimum blood pressure.

STEP 3

STEP 4

Calculate the period using the formula:Period=2π13π6=2π×613π=1213 \text{Period} = \frac{2\pi}{\frac{13\pi}{6}} = \frac{2\pi \times 6}{13\pi} = \frac{12}{13} Period=613π​2π​=13π2π×6​=1312​This period is in seconds per beat.

STEP 5

Convert the period from seconds per beat to beats per minute (bpm). There are 60 seconds in a minute, so:Heart Rate (bpm)=601213=60×1312=65 \text{Heart Rate (bpm)} = \frac{60}{\frac{12}{13}} = 60 \times \frac{13}{12} = 65 Heart Rate (bpm)=1312​60​=60×1213​=65

STEP 6

STEP 7

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1. Determine the period of the sine function to find the heart rate.
2. Calculate the maximum blood pressure.
3. Calculate the minimum blood pressure.

Calculate the period using the formula:
$\text{Period} = \frac{2\pi}{\frac{13\pi}{6}} = \frac{2\pi \times 6}{13\pi} = \frac{12}{13}$
This period is in seconds per beat.

Convert the period from seconds per beat to beats per minute (bpm). There are 60 seconds in a minute, so:
$\text{Heart Rate (bpm)} = \frac{60}{\frac{12}{13}} = 60 \times \frac{13}{12} = 65$