Math

QuestionFind the minimum value of 9x119x - 11 given that x193x \geq \frac{19}{3}.

Studdy Solution

STEP 1

Assumptions1. The function is 9x119x -11 . The constraint on xx is 73+x7 \leq \frac{}{3} + x

STEP 2

First, we need to isolate xx in the inequality. We can do this by subtracting 2\frac{2}{} from both sides.
72x7 - \frac{2}{} \leq x

STEP 3

Now, calculate the value of 7237 - \frac{2}{3}.
723=21323=1937 - \frac{2}{3} = \frac{21}{3} - \frac{2}{3} = \frac{19}{3}

STEP 4

So, the inequality becomes193x\frac{19}{3} \leq x

STEP 5

Now, we need to find the least possible value of 9x119x -11 under this constraint. Since 9x119x -11 is a linear function and its graph is a straight line with a positive slope, the least possible value will occur at the smallest possible value of xx.

STEP 6

So, we substitute x=193x = \frac{19}{3} into the function 9x119x -11.
9x11=9(193)119x -11 =9 \left(\frac{19}{3}\right) -11

STEP 7

Calculate the value of 9(193)119 \left(\frac{19}{3}\right) -11.
9(193)11=5711=469 \left(\frac{19}{3}\right) -11 =57 -11 =46So, the least possible value of 9x119x -11 when 723+x7 \leq \frac{2}{3} + x is 4646.

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