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If (10 - x)/3 < -2x, which of the following must be true? 11 Nov 2021, 04:15
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D
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37% (02:12) correct 63% (02:18) wrong based on 255 sessions

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If \(\frac{10 - x}{3} < -2x\), which of the following must be true?

I. \(2 < x\)

II. \(|x - 5| \geq 7\)

III. \(\frac{|x - 1|}{|x|} > 1\)

A. I Only
B. II Only
C. III Only
D. II and III
E. I, II, and III
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D
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If (10 - x)/3 < -2x, which of the following must be true? 11 Nov 2021, 06:36
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Bunuel
If \(\frac{10 - x}{3} < -2x\), which of the following must be true?

I. \(2 < x\)

II. \(|x - 5| \geq 7\)

III. \(\frac{|x - 1|}{|x|} > 1\)

A. I Only
B. II Only
C. III Only
D. II and III
E. I, II, and III
Show more

\(\frac{10 - x}{3} < -2x\)
\(10 - x< 3*-2x\)
\(6x-x<-10\)
\(5x<-10\)
\(x<-2\)

We are looking for MUST be true.
Do not confuse it with range of x.
Whatever range consists of x<-2 will be true.

I. \(2 < x\)
x<-2 does not fall in the given range.
So never true.

II. \(|x - 5| \geq 7\)
Two cases
\(x - 5\geq 7……….x\geq 12\)
\( 5-x\geq 7……….-2\geq x\)
x<-2 does fall in the range. \( -2\geq x\)
True

III. \(\frac{|x - 1|}{|x|} > 1…….|x-1|>|x|\)
Square both sides
\(x^2-2x+1>x^2……….x<\frac{1}{2}\)
x<-2 does fall in the range. \( x<\frac{1}{2}\)
True


D
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If (10 - x)/3 < -2x, which of the following must be true? 11 Nov 2021, 10:31
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chetan2u sir, I also did solve the question like this, but could not choose second option as valid.
Quote:
\(x - 5\geq 7……….x\geq 12\)
\( 5-x\geq 7……….-2\geq x\)
x<-2 does fall in the range. \( -2\geq x\)
Show more
In the above condition, x can be \(\geq 12\). So, is it enough to be good for a "must be true" question?

Also, I have a question with respect to the method you chose the third condition,
\(\frac{|x - 1|}{|x|} > 1…….|x-1|>|x|\)
I solved it by making three different ranges of absolute modulus's,
First range: x<0. Second range: 0<x<1. Third range: x>1.
I could ascertain from it that \( x<\frac{1}{2}\).
But, you instead just went ahead and squared both the sides, I read somewhere that squaring or multiplying on both sides of inequality is not a good idea as it flips the signs of inequality. Then on that principle is your "squaring" method based upon?
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If (10 - x)/3 < -2x, which of the following must be true? 11 Nov 2021, 11:02
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PyjamaScientist
chetan2u sir, I also did solve the question like this, but could not choose second option as valid.
Quote:
\(x - 5\geq 7……….x\geq 12\)
\( 5-x\geq 7……….-2\geq x\)
x<-2 does fall in the range. \( -2\geq x\)
In the above condition, x can be \(\geq 12\). So, is it enough to be good for a "must be true" question?

Also, I have a question with respect to the method you chose the third condition,
\(\frac{|x - 1|}{|x|} > 1…….|x-1|>|x|\)
I solved it by making three different ranges of absolute modulus's,
First range: x<0. Second range: 0<x<1. Third range: x>1.
I could ascertain from it that \( x<\frac{1}{2}\).
But, you instead just went ahead and squared both the sides, I read somewhere that squaring or multiplying on both sides of inequality is not a good idea as it flips the signs of inequality. Then on that principle is your "squaring" method based upon?
Show more


Yes, x<12 would also be in MUST be true cases.

You can safely square two sides without flipping sign when both sides are non negative.
Here, both are MOD, so non negative.
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If (10 - x)/3 < -2x, which of the following must be true? 11 Oct 2023, 08:04
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↧↧↧ Detailed Video Solution to the Problem ↧↧↧



Given that \(\frac{10 - x}{3} < -2x\)
=> 10 - x < 3*-2x
=> 10 - x < -6x
=> 10 < x - 6x
=> 10 < -5x
=> -5x > 10
=> x < -2

I. \(2 < x\)
Since x < -2 so it cannot be > 2
=> FALSE

II. \(|x - 5| \geq 7\)

Now, lets put values of x < -2
Ex: x = -2.5
=> | -2.5 - 5| = |-7.5| = \(7.5 \geq 7\)
And this will be true for all values of x < -2
=> TRUE

III. \(\frac{|x - 1|}{|x|} > 1\)

Let's try with the same value of x = -2.5
=> \(\frac{|-2.5 - 1|}{|-2.5|}\) = \(\frac{|-3.5|}{|-2.5|}\) = \(\frac{3.5}{2.5}\) > 1
And this will be true for all values of x < -2
=> TRUE

So, Answer will be D
Hope it helps!

Watch the following video to learn the Basics of Absolute Values

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If (10 - x)/3 < -2x, which of the following must be true? 15 Oct 2023, 03:49
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chetan2u
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chetan2u sir, I also did solve the question like this, but could not choose second option as valid.
Quote:
\(x - 5\geq 7……….x\geq 12\)
\( 5-x\geq 7……….-2\geq x\)
x<-2 does fall in the range. \( -2\geq x\)
In the above condition, x can be \(\geq 12\). So, is it enough to be good for a "must be true" question?

Also, I have a question with respect to the method you chose the third condition,
\(\frac{|x - 1|}{|x|} > 1…….|x-1|>|x|\)
I solved it by making three different ranges of absolute modulus's,
First range: x<0. Second range: 0<x<1. Third range: x>1.
I could ascertain from it that \( x<\frac{1}{2}\).
But, you instead just went ahead and squared both the sides, I read somewhere that squaring or multiplying on both sides of inequality is not a good idea as it flips the signs of inequality. Then on that principle is your "squaring" method based upon?


Yes, x<12 would also be in MUST be true cases.

You can safely square two sides without flipping sign when both sides are non negative.
Here, both are MOD, so non negative.
Show more
I also have the same doubt
For example lets take x = 11 . It satisfy that x<12 but this does not tell me that x <-2 and also on the other side its x<= -2 so if x=-2 it fails and for 3rd option if x=0 then it fails . So please clarify, this is a must be true case

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If (10 - x)/3 < -2x, which of the following must be true? 06 Jul 2025, 19:07
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