Solve the inequalities and represent the solution graphically on a number line:
$5(2x - 7) - 3(2x + 3) \leq 0$,$2x + 19 \leq 6x + 47$
$5(2x - 7) - 3(2x + 3) \leq 0$,$2x + 19 \leq 6x + 47$
(N/A) First,solve the first inequality:
$5(2x - 7) - 3(2x + 3) \leq 0$
$10x - 35 - 6x - 9 \leq 0$
$4x - 44 \leq 0$
$4x \leq 44$
$x \leq 11$ ..... $(1)$
Next,solve the second inequality:
$2x + 19 \leq 6x + 47$
$19 - 47 \leq 6x - 2x$
$-28 \leq 4x$
$-7 \leq x$ ..... $(2)$
Combining $(1)$ and $(2)$,the solution set is $[-7, 11]$.
The solution on the number line is represented by shading the interval between $-7$ and $11$,including the endpoints.
$5(2x - 7) - 3(2x + 3) \leq 0$
$10x - 35 - 6x - 9 \leq 0$
$4x - 44 \leq 0$
$4x \leq 44$
$x \leq 11$ ..... $(1)$
Next,solve the second inequality:
$2x + 19 \leq 6x + 47$
$19 - 47 \leq 6x - 2x$
$-28 \leq 4x$
$-7 \leq x$ ..... $(2)$
Combining $(1)$ and $(2)$,the solution set is $[-7, 11]$.
The solution on the number line is represented by shading the interval between $-7$ and $11$,including the endpoints.
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