Answer:
The maximum depth of the water at the place is 6.0 meters.
Given the tidal range and average depth, it is to be noted that the maximum depth of the water at the place, is 6.0 meters.
How can you calculate Maximum Depth using Average Depth and Tidal Range?The tidal range is the successive difference between tide highs and lows, which is a sinusoidal pattern. On the basis of the above, it is correct to state that the tidal range is twice of the amplitude of the tide level.
That is:
The Amplitude of the tide, A = 2.0/2m = 1m
The maximum depth at the place, therefore, is given as:
D[tex]_{max}[/tex] = A + D[tex]_{ave}[/tex]
Hence,
D[tex]_{max}[/tex] = 1.0 + 5.0 = 6.0
Thus, it is correct to state that the Maximum Depth (D[tex]_{max}[/tex]) = 6.0 Meters.
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