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07 Sep 2023, 16:14
Kudos
Bookmarks
I'm having a really hard time understanding why it's y-1 and not -1 - y
I get to the point of having -1 - √(y^2)
I don't understand how |y| = -y (can ever equal that), because the square root of y^2 is y, and if y is assumed negative then shouldn't you just leave it as y, why would you have to add a negative in front of it. Take y=-2, then -y=2 and subsequently not be negative? I'm just stuck on this logic
I get to the point of having -1 - √(y^2)
I don't understand how |y| = -y (can ever equal that), because the square root of y^2 is y, and if y is assumed negative then shouldn't you just leave it as y, why would you have to add a negative in front of it. Take y=-2, then -y=2 and subsequently not be negative? I'm just stuck on this logic
08 Sep 2023, 00:51
Kudos
Bookmarks
epravetz
I'm having a really hard time understanding why it's y-1 and not -1 - y
I get to the point of having -1 - √(y^2)
I don't understand how |y| = -y (can ever equal that), because the square root of y^2 is y, and if y is assumed negative then shouldn't you just leave it as y, why would you have to add a negative in front of it. Take y=-2, then -y=2 and subsequently not be negative? I'm just stuck on this logic
I get to the point of having -1 - √(y^2)
I don't understand how |y| = -y (can ever equal that), because the square root of y^2 is y, and if y is assumed negative then shouldn't you just leave it as y, why would you have to add a negative in front of it. Take y=-2, then -y=2 and subsequently not be negative? I'm just stuck on this logic
Firstly, \(\sqrt{y^2}=|y|\). This is because the square root function always returns non-negative values, and |y| ensures that the result is non-negative for all y.
For instance, consider y = -5:
\(\sqrt{(-5)^2} = \sqrt{25} = 5\), which is |-5|.
Next, when \(y \geq 0\), |y| is simply y. This is because y is already non-negative, so there's no need for adjustment.
For instance, if \(y = 3\):
\(|3| = 3\)
However, when \(y < 0\), |y| is -y to make it non-negative.
For example, for \(y = -2\):
\(|-2| = -(-2) = 2\)
Thus, this property ensures that the result of |y| is always non-negative, regardless of the original sign of y.
The above are basic properties of absolute values, so I suggest brushing up on fundamentals before solving hard questions on modulus:
10. Absolute Value
- Theory
Math: Absolute value (Modulus)
Absolute Value: Tips and hints
Properties of Absolute Values on the GMAT
Absolute modulus : A better understanding
GMAT Question Patterns: Abolute Value
The Reason Behind Absolute Value Questions on the GMAT
For more check Ultimate GMAT Quantitative Megathread
Hope it helps.
30 Oct 2023, 08:51
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Bunuel
If \(x\) and \(y\) are negative numbers, what is the value of \(\frac{\sqrt{x^2} }{x}-\sqrt{-y*|y|}\)?
A. \(1+y\)
B. \(1-y\)
C. \(-1-y\)
D. \(y-1\)
E. \(x-y\)
A. \(1+y\)
B. \(1-y\)
C. \(-1-y\)
D. \(y-1\)
E. \(x-y\)
Hello Bunuel
Really amazing question and explanation to understand the relation between absolute values and square roots.
The square root of y^2 will be |y|.
I just had one query here, how would we simplify the following expression:
Square root of (-y * y): would it be |y| only? Or square root of -x^2 ? Would it be |x| only?
Thank you Bunuel
