$\"\"$

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A 200 gallon tank is half full.

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Thus, $\"\"$ gallon.

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At time $\"\"$ , tank contains $\"\"$ pounds of concentrate per gallon.

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Concentrate per gallon enters into the tank $\"\"$ gallons per minute.

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The solution mixture is withdrawn at $\"\"$ gallons per minute.

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(a)

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Volume of the solution at any time $\"\"$ is given by $\"\"$ .

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Find the time when tank be full, $\"\"$ .

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$\"\"$

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Tank is full in $\"\"$ .

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$\"\"$

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(b)

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$\"\"$ .

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Substitute corresponding values in the above expression.

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$\"\"$

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$\"\"$ .

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Write the differential equation in the standard from $\"\"$ .

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Here $\"\"$ and $\"\"$ .

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Solution of first order linear differential equation $\"\"$ is $\"\"$ .

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Where integrating factor $\"\"$ .

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Find integrating factor.

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$\"\"$

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$\"\"$

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Integrating factor $\"\"$ .

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Solution of the differential equation is

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$\"\"$

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$\"\"$ . $\"\"$

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Find the constant by applying initial conditions.

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At time $\"\"$ , amount of concentrate in the solution $\"\"$ .

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$\"\"$

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Particular solution is $\"\"$ .

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Tank is full at $\"\"$ .

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$\"\"$

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$\"\"$

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$\"\"$ .

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At the time of tank is full, pounds of concentrate is $\"\"$ .

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$\"\"$

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(c)

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Volume of the solution at any time $\"\"$ is given by $\"\"$ .

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Find the time when tank be full, $\"\"$ .

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$\"\"$

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Tank is full in $\"\"$ .

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Consider $\"\"$ .

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Here $\"\"$ .

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$\"\"$

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Integrating factor $\"\"$ .

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Here $\"\"$ and $\"\"$ .

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Solution of the differential equation is

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$\"\"$

\

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$\"\"$

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Find the constant by applying initial conditions.

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At time $\"\"$ , amount of concentrate in the solution $\"\"$ .

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$\"\"$

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Particular solution is $\"\"$ .

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Tank is full at $\"\"$ mins.

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$\"\"$

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$\"\"$

\

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$\"\"$ .

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$\"\"$

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(a) $\"\"$ .

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(b) $\"\"$ .

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(c) $\"\"$ .