QUESTION IMAGE
Question
which are correct representations of the inequality $-3(2x - 5) < 5(2 - x)$? select two options.
$\square$ $x < 5$
$\square$ $-6x - 5 < 10 - x$
$\square$ $-6x + 15 < 10 - 5x$
$\square$ (number line with open circle at 5, arrow to the right)
$\square$ (number line with open circle at -5, arrow to the left)
Step1: Expand both sides
First, expand \(-3(2x - 5)\) and \(5(2 - x)\).
For \(-3(2x - 5)\), using the distributive property \(a(b - c)=ab - ac\), we get \(-3\times2x - (-3)\times5=-6x + 15\).
For \(5(2 - x)\), using the distributive property \(a(b - c)=ab - ac\), we get \(5\times2 - 5\times x = 10 - 5x\).
So the inequality becomes \(-6x + 15<10 - 5x\).
Step2: Solve the inequality for \(x\)
Start with \(-6x + 15<10 - 5x\).
Add \(6x\) to both sides: \(-6x + 6x+ 15<10 - 5x+ 6x\), which simplifies to \(15<10 + x\).
Subtract \(10\) from both sides: \(15 - 10<10 - 10+ x\), so \(5
\(-6x + 15+6x<10 - 5x+6x\)
\(15<10 + x\)
Then subtract \(10\): \(15 - 10
Add \(5x\) to both sides: \(-6x+5x + 15<10 - 5x+5x\)
\(-x + 15<10\)
Subtract \(15\) from both sides: \(-x+15 - 15<10 - 15\)
\(-x<-5\)
Multiply both sides by \(-1\) (remember to reverse the inequality sign): \(x > 5\)? Wait, no, that can't be. Wait, let's re - expand:
\(-3(2x - 5)=-6x + 15\) (correct, because \(-3\times2x=-6x\) and \(-3\times(-5) = 15\))
\(5(2 - x)=10 - 5x\) (correct, \(5\times2 = 10\) and \(5\times(-x)=-5x\))
So the inequality is \(-6x + 15<10 - 5x\) (so the third option is correct).
Now, solve \(-6x + 15<10 - 5x\):
Add \(6x\) to both sides: \(15<10 + x\)
Subtract \(10\): \(5
Wait, let's do it again:
\(-6x + 15<10 - 5x\)
Subtract \(15\) from both sides: \(-6x<10 - 15 - 5x\)
\(-6x<-5 - 5x\)
Add \(5x\) to both sides: \(-6x + 5x<-5\)
\(-x<-5\)
Multiply both sides by \(-1\), reverse the inequality: \(x > 5\). Wait, but the number line with the open circle at \(5\) and arrow to the right (the fourth option) represents \(x>5\), and the third option \(-6x + 15<10 - 5x\) is the expanded form. Wait, but the first option is \(x < 5\), which is wrong. Wait, maybe the original problem has a typo? Wait, no, let's check the expansion again.
Wait, \(-3(2x - 5)\): distribute \(-3\) to \(2x\) and \(-5\): \(-3\times2x=-6x\), \(-3\times(-5)=15\), so \(-6x + 15\). Correct.
\(5(2 - x)\): \(5\times2 = 10\), \(5\times(-x)=-5x\), so \(10 - 5x\). Correct. So the inequality is \(-6x + 15<10 - 5x\) (third option is correct).
Now, solving \(-6x + 15<10 - 5x\):
\(-6x+5x<10 - 15\)
\(-x<-5\)
\(x > 5\) (multiply both sides by \(-1\), reverse inequality). So the number line with open circle at \(5\) and arrow to the right (the fourth option: the one with 5,6,7,...) represents \(x > 5\), and the third option \(-6x + 15<10 - 5x\) is correct. Wait, but the first option is \(x < 5\), which is incorrect. Wait, maybe I messed up the sign when distributing?
Wait, no, \(-3(2x - 5)=-6x + 15\) is correct. \(5(2 - x)=10 - 5x\) is correct. Then solving:
\(-6x + 15<10 - 5x\)
\(-6x+5x<10 - 15\)
\(-x<-5\)
\(x > 5\). So the correct options are \(-6x + 15<10 - 5x\) (third option) and the number line with open circle at 5 and arrow to the right (fourth option) and also, wait, maybe I made a mistake in the sign during solving. Wait, let's check with a test value. Let's take \(x = 6\) (which is greater than 5).
Left side of original inequality: \(-3(2\times6 - 5)=-3(12 - 5)=-3\times7=-21\)
Right side: \(5(2 - 6)=5\times(-4)=-20\)
Is \(-21<-20\)? Yes, that's true.
Take \(x = 4\) (less than 5):
Left side: \(-3(8 - 5)=-3\times3=-9\)
Right side: \(5(2 - 4)=5\times(-2)=-10\)
Is \(-9<-10\)? No, that…
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- \(-6x + 15 < 10 - 5x\)
- The number line with an open circle at 5 and the arrow pointing to the right (the fourth option in the list of options, the one with 5, 6, 7 marked on the number line)
(If we consider the options as per the checkboxes: the third option \(-6x + 15 < 10 - 5x\) and the fourth option (the number line with open circle at 5 and arrow to the right) are correct. Also, if we re - evaluate, maybe there was a miscalculation earlier. Wait, let's check the first option again. If we made a mistake in solving:
Wait, let's start over:
Inequality: \(-3(2x - 5)<5(2 - x)\)
Expand left side: \(-6x + 15\)
Expand right side: \(10 - 5x\)
So inequality: \(-6x + 15<10 - 5x\) (third option is correct)
Now, solve for \(x\):
\(-6x + 15<10 - 5x\)
Subtract \(15\) from both sides: \(-6x<10 - 15 - 5x\)
\(-6x<-5 - 5x\)
Add \(5x\) to both sides: \(-6x + 5x<-5\)
\(-x<-5\)
Multiply both sides by \(-1\), reverse inequality: \(x > 5\)
So the solution is \(x > 5\), which is represented by the number line with an open circle at 5 and arrow to the right (the fourth option: the one with 5,6,7,...) and the third option \(-6x + 15<10 - 5x\) is the expanded form. So the two correct options are:
- \(-6x + 15 < 10 - 5x\) (third checkbox)
- The number line with an open circle at 5 and arrow pointing to the right (fourth checkbox, the one with 5, 6, 7 on the number line)