How do you solve $(2x-1)/(3x-2) <=1$ ?

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How do you solve $(2x-1)/(3x-2) <=1$ ?

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Answer 1 · 2015-05-10T10:54:14

Solve $(2x-1)/(3x-2)<=1$

Multiply both sides by $3x-2$

$(cancel (3x-2)xx2x-1)/cancel(3x-2)<=1xx(3x-2)$ =

$2x-1<=3x-2$

Subtract $3x$ from both sides.

$2x-1-3x<=-2$

Add $1$ to both sides.

$2x-3x<=-2+1$ =

$-x<=-1$

Multiply by $-1$

$x>=1$

Answer 2 · 2015-05-10T20:47:24

$(2x-1)/(3x-2) <= 1$

Case 1:
If $3x-2<0$
which implies $color(red)(x<2/3)$
then
$2x-1 >= 3x-2$
( since multiplying by a negative reverses the inequality)
and
$color(red)(x<= 1)$
Combining the Case 1 restrictions on $x$
$color(red)(x<2/3)$ and $color(red)(x<=1)$
gives
$color(red)(x<2/3)$

Case2
If $3x-2>0$
which implies $color(blue)(x>2/3)$
then
$2x-1<=3x-2$
$color(blue)(x>=1)$
Combining the Case 2 restrictions on $x$
$color(blue)(x>2/3)$ and $color(blue)(x>=1)$
gives
$color(blue)(x>=1)$

Solution
$x<2/3$ or $x>=1$

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