Solve the following linear programming problem using graphical method. Maximize Z=60 x+40 y, Under the constraints x+2 y 12 2 x+y 12 x+5 4 y 5 ; x 0, y 0

Solve the following linear programming problem using graphical me…

Solve the differential equation $(x+y) d y+(x-y) d x=0$, given $y =1$ when $x =1$.

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If function $f(x)=\frac{\sqrt{x}-\sqrt{a}}{x-a}$, is continuous at $x=a$, then find value of $f(a)$.

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Solve the following linear programming problem for minimisation by graphical method :
Objective function
$
\begin{aligned}Z = 5 x + y \\
constraints
3 x + 5 y & \geq 1 5 \\
5 x + 2 y & \leq 1 0 \\
x \geq 0 , y & \geq 0
\end{aligned}
$

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Prove that $\tan ^{-1}\left(\frac{63}{16}\right)=\sin ^{-1}\left(\frac{5}{13}\right)+\cos ^{-1}\left(\frac{3}{5}\right)$

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Maximize $Z=4 x+y$ subject to constraints $x+y$ $\leq 50,3 x+y \leq 90, x \geq 0, y \geq 0$ by using graphical method.

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Examine the continuity and differentiability of function $f(x)=|x|+|x-1|$ in interval $(-1,2)$.

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Maximize $Z =3 x+2 y$ subject to constraints$5 x+2 y \leq 10$ $3 x+5 y \leq 15$ $x \geq 0, y \geq 0$using graphical method.

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An aeroplane can carry a maximum of 200 passengers. A profit of Rs. 400 is made, on each executive class ticket and a profit of Rs. 600 is made on each economy class ticket. The airline reserves at least 20 seats for executive class. However at least 4 times as many passengers prefer to travel by economy class than by executive class. Formulate linear programming problem in order to maximize the profit for the airline.

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Maximise $z=4 x+y$ subject to the constraints -
$\begin{array}{l}x+y \leq 50 \\3 x+y \leq 20 \\x \geq 0, y \geq 0\end{array}$

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Find the vector and Cartesian equations of the line through the point (5, 2, -4) and which is parallel to the vector $3\hat i + 2\hat j - 8\hat k$.

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