Business math: relative max/min; demand eqn; demand & cost fcns; deriv. of cont. fcn
Hi everyone .. i have 6 business math questions .. i tried to solve but most of them i have final check i did my best but couldn't solve only half of question
Please check attachments
Q1: [illegible]
Q2: The demand equation for a certain commodity is given by the following equation:
. . . . .\(\displaystyle p\, =\, \dfrac{1}{12}\, x^2\, -\, 24x\, +\, 1728,\, 0\, \leq\, x\, \leq\, 144\)
Find x and the corresponding price p that maximize revenue.
Q3: [illegible]
Q4: [illegible]
Q5: Test for relative maxima and minima. Use the Second Derivative Test, if possible.
. . . . .\(\displaystyle y\, =\, \dfrac{1}{3}\, x^3\, -\, 2x^2\, +\, 3x\, +\, 5\)
Q6: Test for relative maxima and minima. Use the Second Derivative Test, if possible.
. . . . .\(\displaystyle y\, =\, x^3\, -\, 3x\, +\, 6\)
Hi everyone .. i have 6 business math questions .. i tried to solve but most of them i have final check i did my best but couldn't solve only half of question
Please check attachments
Q1: [illegible]
Q2: The demand equation for a certain commodity is given by the following equation:
. . . . .\(\displaystyle p\, =\, \dfrac{1}{12}\, x^2\, -\, 24x\, +\, 1728,\, 0\, \leq\, x\, \leq\, 144\)
Find x and the corresponding price p that maximize revenue.
Q3: [illegible]
Q4: [illegible]
Q5: Test for relative maxima and minima. Use the Second Derivative Test, if possible.
. . . . .\(\displaystyle y\, =\, \dfrac{1}{3}\, x^3\, -\, 2x^2\, +\, 3x\, +\, 5\)
Q6: Test for relative maxima and minima. Use the Second Derivative Test, if possible.
. . . . .\(\displaystyle y\, =\, x^3\, -\, 3x\, +\, 6\)
Attachments
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