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Solve the Problem $y = \sin ( 2 \pi l t )$

Question 345

Multiple Choice

Solve the problem.
-On a Touch-Tone phone, each button produces a unique sound. The sound produced is the sum of two tones, gi' $y = \sin ( 2 \pi l t )$ and $y = \sin ( 2 \pi h t )$
where $l$ and $h$ are the low and high frequencies (cycles per second) shown on the illustration.
$Solve the problem. -On a Touch-Tone phone, each button produces a unique sound. The sound produced is the sum of two tones, gi' y = \sin ( 2 \pi l t ) and y = \sin ( 2 \pi h t ) where l and h are the low and high frequencies (cycles per second) shown on the illustration. The sound produced is thus given by y = \sin ( 2 \pi l t ) + \sin ( 2 \pi h t ) Write the sound emitted by touching the 4 key as a product of sines and cosines. A) y = 2 \sin ( 439 \pi t ) \cos ( 1,979 \pi t ) B) y = 2 \sin ( 566 \pi t ) \cos ( 2,106 \pi t ) C) y = 2 \sin ( 2,106 \pi t ) \cos ( 566 \pi t ) D) y = 2 \sin ( 1,979 \pi t ) \cos ( 439 \pi t )$
The sound produced is thus given by $y = \sin ( 2 \pi l t ) + \sin ( 2 \pi h t )$
Write the sound emitted by touching the 4 key as a product of sines and cosines.

A) $y = 2 \sin ( 439 \pi t ) \cos ( 1,979 \pi t )$
B) $y = 2 \sin ( 566 \pi t ) \cos ( 2,106 \pi t )$
C) $y = 2 \sin ( 2,106 \pi t ) \cos ( 566 \pi t )$
D) $y = 2 \sin ( 1,979 \pi t ) \cos ( 439 \pi t )$

Solve the Problem y=sin⁡(2πlt)y = \sin ( 2 \pi l t )y=sin(2πlt)

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Solve the Problem $y = \sin ( 2 \pi l t )$

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