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If |x - 5| + |x - 7| < 4, what is the range of values of x ? (A) 4 <
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15 Nov 2021, 03:13
15 Nov 2021, 03:13
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If |x - 5| + |x - 7| < 4, what is the range of values of x ?
(A) 4 < x < 8
(B) -4 < x < 8
(C) 3 < x < 5
(D) -8 < x < -4
(E) -4 < x < 4
(A) 4 < x < 8
(B) -4 < x < 8
(C) 3 < x < 5
(D) -8 < x < -4
(E) -4 < x < 4
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If |x - 5| + |x - 7| < 4, what is the range of values of x ? (A) 4 <
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30 Dec 2021, 22:12
30 Dec 2021, 22:12
1
Given that |x - 5| + |x - 7| < 4 and we need to find the range of values of x
Let's solve the problem using three methods
Method 1: Substitution
Let's take values in each answer choice and substitutive in the equation and check which one satisfies the equation.
If you glance through the answer choices then you will see that if u take x=0 and are able to prove it wrong then we can eliminate B and E
(B), (E) : x=0
=> |x - 5| + |x - 7| < 4 => |0 - 5| + |0 - 7| < 4 => 5 + 7 = 12 NOT LESS THAN 4
=> FALSE
(A) 4 < x < 8 x = 7
=> |7 - 5| + |7 - 7| < 4 => |2| + 0 < 4
=> TRUE => Possible
(C) 3 < x < 5 x = 4
=> |4 - 5| + |4 - 7| < 4 => |-1| + |-3| = 4 NOT LESS THAN 4
=> FALSE
(D) -8 < x < -4 x = -5
=> |-5 - 5| + |-5 - 7| < 4 => |-10| + |-12| < 4 => 10 + 12 NOT LESS THAN 4
=> FALSE
Method 2: Algebra
|x - 5| + |x - 7| < 4
Let's find the points where the values inside the Absolute Value will change signs
=> x-5 = 0 => x = 5
=> x-7 = 0 => x = 7
So, we can divide the number line into three parts
x < 5, 5 <= x < 7 , x > 7
5 to 7.JPG [ 19.92 KiB | Viewed 1674 times ]
Case 1: x < 5
|x - 5| = -(x-5) (as x-5 will be negative)
|x - 7| = -(x-7) (as x-7 will be negative)
=> -(x - 5) + (-(x - 7)) < 4 => -x + 5 -x +7 < 4 => -2x + 12 < 4
=> -2x < 4-12 => -2x < -8 => x > \(\frac{-8}{-2}\) => x > 4
But the condition was x < 5
So, intersection is 4 < x < 5
Case 2: 5 <= x < 7
|x - 5| = x-5 (as x-5 will be non-negative)
|x - 7| = -(x-7) (as x-7 will be negative)
=> x - 5 + (-(x - 7)) < 4 => x - 5 -x +7 < 4 => 2 < 4
Which is always true
=> 5 <= x < 7
Case 3: x >= 7
|x - 5| = x-5 (as x-5 will be non-negative)
|x - 7| = x-7 (as x-7 will be non-negative)
=> x - 5 + x - 7 < 4 => -x + 5 + x -7 < 4 => 2x - 12 < 4
=> 2x < 4+12 => 2x < 16 => x < \(\frac{16}{2}\) => x < 8
But the condition was x >= 7
So, intersection is 7 <= x < 8
So, solution is 4 < x < 5, 5 <= x < 7, 7 <= x < 8
Which is nothing but 4 < x < 8
Method 3: Graphical Method
| x - 5 | is the distance between x and 5
| x - 7 | is the distance between x and 7
Case 1: If we take a value of x between 5 and 7
between 5 and 7.JPG [ 15.76 KiB | Viewed 1665 times ]
Then, the distance between x and 5 + Distance between x and 7 = Distance between 5 and 7 = 2 < 4
=> All values between 5 and 7 inclusive are possible
Case 2: If we take a value of x < 5
x lt 5.JPG [ 17.1 KiB | Viewed 1677 times ]
Then Distance between x and 7 = Distance between x and 5 + Distance between 5 and 7
=> Distance between x and 7 = Distance between x and 5 + 2
So, for Distance between x and 5 + Distance between x and 7 < 4
=> Distance between x and 5 + Distance between x and 5 + 2 < 4
=> 2 * Distance between x and 5 < 4-2
=> Distance between x and 5 < 1
So, If x is at a distance of less than 1 from 5 on the left hand side then it is possible
=> 4 < x <= 5
Case 3: If we take a value of x > 7
x gt 7.JPG [ 19.27 KiB | Viewed 1668 times ]
Then Distance between x and 5 = Distance between x and 7 + Distance between 5 and 7
=> Distance between x and 5 = Distance between x and 7 + 2
So, for Distance between x and 5 + Distance between x and 7 < 4
=> Distance between x and 7 + 2 + Distance between x and 7 < 4
=> 2 * Distance between x and 7 < 4-2
=> Distance between x and 7 < 1
So, If x is at a distance of less than 1 from 7 on the right hand side then it is possible
=> 7 =< x < 8
So, solution is 4 < x < 5, 5 <= x < 7, 7 <= x < 8
Which is nothing but 4 < x < 8
So, Answer will be A
Hope it helps!
Watch the following video to learn How to Solve Absolute Value Problems
Let's solve the problem using three methods
Method 1: Substitution
Let's take values in each answer choice and substitutive in the equation and check which one satisfies the equation.
If you glance through the answer choices then you will see that if u take x=0 and are able to prove it wrong then we can eliminate B and E
(B), (E) : x=0
=> |x - 5| + |x - 7| < 4 => |0 - 5| + |0 - 7| < 4 => 5 + 7 = 12 NOT LESS THAN 4
=> FALSE
(A) 4 < x < 8 x = 7
=> |7 - 5| + |7 - 7| < 4 => |2| + 0 < 4
=> TRUE => Possible
(C) 3 < x < 5 x = 4
=> |4 - 5| + |4 - 7| < 4 => |-1| + |-3| = 4 NOT LESS THAN 4
=> FALSE
(D) -8 < x < -4 x = -5
=> |-5 - 5| + |-5 - 7| < 4 => |-10| + |-12| < 4 => 10 + 12 NOT LESS THAN 4
=> FALSE
Method 2: Algebra
|x - 5| + |x - 7| < 4
Let's find the points where the values inside the Absolute Value will change signs
=> x-5 = 0 => x = 5
=> x-7 = 0 => x = 7
So, we can divide the number line into three parts
x < 5, 5 <= x < 7 , x > 7
Attachment:
5 to 7.JPG [ 19.92 KiB | Viewed 1674 times ]
Case 1: x < 5
|x - 5| = -(x-5) (as x-5 will be negative)
|x - 7| = -(x-7) (as x-7 will be negative)
=> -(x - 5) + (-(x - 7)) < 4 => -x + 5 -x +7 < 4 => -2x + 12 < 4
=> -2x < 4-12 => -2x < -8 => x > \(\frac{-8}{-2}\) => x > 4
But the condition was x < 5
So, intersection is 4 < x < 5
Case 2: 5 <= x < 7
|x - 5| = x-5 (as x-5 will be non-negative)
|x - 7| = -(x-7) (as x-7 will be negative)
=> x - 5 + (-(x - 7)) < 4 => x - 5 -x +7 < 4 => 2 < 4
Which is always true
=> 5 <= x < 7
Case 3: x >= 7
|x - 5| = x-5 (as x-5 will be non-negative)
|x - 7| = x-7 (as x-7 will be non-negative)
=> x - 5 + x - 7 < 4 => -x + 5 + x -7 < 4 => 2x - 12 < 4
=> 2x < 4+12 => 2x < 16 => x < \(\frac{16}{2}\) => x < 8
But the condition was x >= 7
So, intersection is 7 <= x < 8
So, solution is 4 < x < 5, 5 <= x < 7, 7 <= x < 8
Which is nothing but 4 < x < 8
Method 3: Graphical Method
| x - 5 | is the distance between x and 5
| x - 7 | is the distance between x and 7
Case 1: If we take a value of x between 5 and 7
Attachment:
between 5 and 7.JPG [ 15.76 KiB | Viewed 1665 times ]
Then, the distance between x and 5 + Distance between x and 7 = Distance between 5 and 7 = 2 < 4
=> All values between 5 and 7 inclusive are possible
Case 2: If we take a value of x < 5
Attachment:
x lt 5.JPG [ 17.1 KiB | Viewed 1677 times ]
Then Distance between x and 7 = Distance between x and 5 + Distance between 5 and 7
=> Distance between x and 7 = Distance between x and 5 + 2
So, for Distance between x and 5 + Distance between x and 7 < 4
=> Distance between x and 5 + Distance between x and 5 + 2 < 4
=> 2 * Distance between x and 5 < 4-2
=> Distance between x and 5 < 1
So, If x is at a distance of less than 1 from 5 on the left hand side then it is possible
=> 4 < x <= 5
Case 3: If we take a value of x > 7
Attachment:
x gt 7.JPG [ 19.27 KiB | Viewed 1668 times ]
Then Distance between x and 5 = Distance between x and 7 + Distance between 5 and 7
=> Distance between x and 5 = Distance between x and 7 + 2
So, for Distance between x and 5 + Distance between x and 7 < 4
=> Distance between x and 7 + 2 + Distance between x and 7 < 4
=> 2 * Distance between x and 7 < 4-2
=> Distance between x and 7 < 1
So, If x is at a distance of less than 1 from 7 on the right hand side then it is possible
=> 7 =< x < 8
So, solution is 4 < x < 5, 5 <= x < 7, 7 <= x < 8
Which is nothing but 4 < x < 8
So, Answer will be A
Hope it helps!
Watch the following video to learn How to Solve Absolute Value Problems
General Discussion
Retired Moderator
Joined: 10 Apr 2015
Posts: 6218
Given Kudos: 136
Re: If |x - 5| + |x - 7| < 4, what is the range of values of x ? (A) 4 <
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15 Nov 2021, 06:25
15 Nov 2021, 06:25
1
Carcass wrote:
If |x - 5| + |x - 7| < 4, what is the range of values of x ?
(A) 4 < x < 8
(B) -4 < x < 8
(C) 3 < x < 5
(D) -8 < x < -4
(E) -4 < x < 4
(A) 4 < x < 8
(B) -4 < x < 8
(C) 3 < x < 5
(D) -8 < x < -4
(E) -4 < x < 4
For these kinds of questions, I typically find that the easiest/fastest approach is to simply test numbers.
For example, is x = 0 a solution to |x - 5| + |x - 7| < 4?
Plug x = 0 into the inequality to get: |0 - 5| + |0 - 7| < 4
Simplify: 5 + 7 < 4. Doesn't work!
So x = 0 is NOT a solution, which means we can eliminate B and E, since they say that x = 0 IS a solution.
Now let's test x = 4
Plug x = 4 into the inequality to get: |4 - 5| + |4 - 7| < 4
Simplify: 1 + 3 < 4. Doesn't work!
Since x = 4 is NOT a solution, we can eliminate C, since it says x = 4 IS a solution.
We're down to A and D.
We'll test x = 6 to get: |6 - 5| + |6 - 7| < 4
Simplify: 1 + 1 < 4. WORKS!
Since x = 6 is a solution, we can eliminate D, since it says x = 6 is NOT a solution.
Answer: A
