The height, h, in metres of the tide in a given location on a given day at t hours after midnight can be modelled using the sinusoidal function h(t) = 5sin(30(t-5))+7 What time is the high tide?What time is the low tide?

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The height, h, in metres of the tide in a given location on a given day at t hours after midnight can be modelled using the sinusoidal function h(t) = 5sin(30(t-5))+7 What time is the high tide?What time is the low tide?

Is this question related to either the maximum or the minimum value of the graph. Does the period play a role here as well?

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Answer 1 · 2016-09-22T16:34:03

The height, h, in metres of the tide in a given location on a given day at t hours after midnight can be modelled using the sinusoidal function
$h (t) = 5 sin (30 (t - 5)) + 7$ $h(t) = 5sin(30(t-5))+7$

$At the time of high tide h (t) will be maximum when sin (30 (t - 5)) is maximum$ $"At the time of high tide "h(t) "will be maximum when " sin(30(t-5))" is maximum"$

$This means sin (30 (t - 5)) = 1$ $"This means " sin(30(t-5))=1$
$\Rightarrow 30 (t - 5) = 90 \Rightarrow t = 8$ $=>30(t-5)=90=>t=8$
So first high tide after midnight will be at $8 am$ $8" am"$

Again for next high tide $30 (t - 5) = 450 \Rightarrow t = 20$ $30(t-5)=450=>t=20$
This means second high tide will be at $8 pm$ $8" pm"$

So at 12 hr interval the high tide will come.

$At the time of low tide h (t) will be minimum when sin (30 (t - 5)) is minimum$ $"At the time of low tide "h(t) "will be minimum when " sin(30(t-5))" is minimum"$

$This means sin (30 (t - 5)) = - 1$ $"This means " sin(30(t-5))=-1$
$\Rightarrow 30 (t - 5) = - 90 \Rightarrow t = 2$ $=>30(t-5)=-90=>t=2$
So first low tide after midnight will be at $2 am$ $2" am"$

Again for next low tide $30 (t - 5) = 270 \Rightarrow t = 14$ $30(t-5)=270=>t=14$
This means second low tide will be at $2 pm$ $2" pm"$

So after 12 hr interval the low tide will come.

Here period is $\frac{2 π}{ω} = \frac{360}{30} h r = 12 h r$ $(2pi)/omega =360/30hr=12hr$ so this will be interval between two consecutive high tide or between two consecutive low tide.

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The height, h, in metres of the tide in a given location on a given day at t hours after midnight can be modelled using the sinusoidal function h(t) = 5sin(30(t-5))+7 What time is the high tide?What time is the low tide?

Is this question related to either the maximum or the minimum value of the graph. Does the period play a role here as well?

1 Answer

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