Linear Equations in One Variable

For $a , b \in R $ and $ a \neq 0$, equalities in the form of $ ax +b = 0 $ are called linear equations in one variable.

The number $ x = \displaystyle{ -\frac{b}{a} } $ that satisfies the equality $ ax +b = 0 $ is called the root of this equation, and the solution set of the equation is given by:

Examples:

$ \bullet \quad (x+2)^2 – (x-5)^2 = 13x -16$ Let’s find the solution set of the equation.

\[ (x+2)^2 \ – \ (x \ – \ 5)^2 = 13x \ – \ 16 \]

\[ \Rightarrow (x+2 )^2 \ – \ (x \ – \ 5)^2 = 13x \ – \ 16 \]

\[ \Rightarrow 7(2x \ – \ 3) = 13x \ – \ 16 \]

\[ \Rightarrow 14x \ – \ 21 = 13x \ – \ 16 \]

\[ \Rightarrow 14x \ – \ 13x = 21 \ – \ 16 \]

\[ \Rightarrow x = 5 \]

\[ \Rightarrow S = \left\{5 \right\} \]

Note: The elements of a set are enclosed within braces $ \left\{ \right\} $.

$ \bullet \quad \frac{2x – 1}{3} + \frac{3x+2}{6} = 2 $ Let’s find the solution set of the equation.

\[ \frac{2x \ – \ 1 }{3} + \frac{3x +2}{6} = 2 \]

\[ \Rightarrow \frac{2(2x \ – \ 1) }{2 \cdot 3} + \frac{3x+2}{6} = 2 \]

\[\Rightarrow \frac{4x \ – \ 2 + 3x+ 2 }{6} = 2 \]

\[ \Rightarrow 7x = 12 \]

\[ \Rightarrow x = \frac{12}{7} \]

\[ \Rightarrow S = \left\{\frac{12}{7} \right\} \]

Warning:

In rational equations of the form \[ \frac{ P(x)}{Q(x)} = 0 \] we must have $ P(x) =0 $ and $ Q(x) \neq 0 $. The values of $x$ that make the denominator zero make the fraction undefined, and therefore they cannot be elements of the solution set.

In equations of the form \[ P(x) \cdot Q(x) = 0 \] we must have $ P(x) =0 $ or $ Q(x) =0 $.

Question 1

\[ \frac{x}{x-2} + \frac{1}{2x-1} = \frac{4}{x^2-4} + \frac{2x}{2x-1} \]

What is the solution set of the equation?

\[
\text{A)} \{ 0,2 \} \quad
\text{B) } \{ 2 \} \quad
\text{C) } \{ 0 \} \quad
\text{D) } \{ 1,2 \} \quad
\text{E) } \{ 3 \}
\]

Solution:

\[ \frac{x}{x \ – \ 2} + \frac{1}{2x \ – \ 1} = \frac{4}{x^2 \ – \ 4} + \frac{2x}{2x \ – \ 1} \]

\[ \Rightarrow \frac{x}{x-2} =\frac{4}{x^2 \ – \ 4} + \frac{2x \ – \ 1}{2x \ – \ 1} \]

\[ \Rightarrow \frac{x}{x-2} = \frac{4 + x^2 \ – \ 4}{x^2 \ – \ 4} \]

\[ \Rightarrow x(x^2-4) = (x \ – \ 2)x^2 \]

\[\Rightarrow 2x (x \ – \ 2) =0 \]

\[ \Rightarrow x = 0 \quad \text{or} \quad x= 2 \]

Here, for

\[ x = 2 \Rightarrow \frac{x}{x \ – \ 2} \quad \text{and} \quad \frac{4}{x^2 \ – \ 4} \]

the denominators of the fractions become 0, so the number 2 cannot be an element of the solution set. Therefore,

\[ S = \{ 0 \} \]

$\textbf{Answer: C} $

Question 2

\[ \displaystyle \frac{ \displaystyle \frac{x}{x \ – \ 1} + \displaystyle \frac{1}{1 \ – \ x} }{x} = \frac{x}{2 \ – \ x} \]

What is the solution set of the equation?

\[
\text{A)} \{ 1,2 \} \quad
\text{B) } \{ -1, 2 \} \quad
\text{C) } \{ -2, -1 \} \quad
\text{D) } \{ -2 \} \quad
\text{E) } \{ -1 \}
\]

Solution:

\[ \frac { \displaystyle \frac{x}{x \ – \ 1}+ \displaystyle \frac{1}{1 \ – \ x} }{x} = \displaystyle \frac{x}{2 \ – \ x} \Rightarrow \frac{ \displaystyle \frac{x}{x \ – \ 1} \ – \ \displaystyle \frac{1}{x \ – \ 1} }{x} = \displaystyle \frac{x}{2 \ – \ x} \]

\[ \Rightarrow \frac{\displaystyle\frac{x – 1}{x – 1}}{x} = \frac{x}{2 – x} \]

\[ \Rightarrow \frac{1}{x} = \frac{x}{2 \ – \ x} \]

\[\Rightarrow x^2 = 2 \ – \ x \]

\[\Rightarrow x^2 +x \ – \ 2 = 0 \]

\[\Rightarrow (x \ – \ 1) \cdot (x+2 )= 0 \]

$ \Rightarrow x = 1 $ or $ \Rightarrow x = -2 $ is found. Here, since the denominator of the fraction $ \displaystyle \frac{x}{x-1 } $ becomes $0 $ when $ x = 1 $, the number $ 1$ cannot be an element of the solution set. Therefore,

\[ S = \{ -2 \} \]

$\textbf{Answer: D} $

Question 3

\[ x = \frac{3}{m+1} \quad \text{and} \quad y = \frac{2m+3 }{m+1 } \]

What is $y$ expressed in terms of $x$?

\[
\text{A)} \frac{2+x}{5} \quad
\text{B) } \frac{6+x}{3} \quad
\text{C) } \frac{2x+1}{3} \quad
\text{D) } \frac{x+1}{5} \quad
\text{E) } x \ – \ 3
\]

Solution:

\[ y= \frac{2m+ 3 }{m+1 } = \frac{2 (m+1 ) +1}{m+1 } = 2+ \frac{1}{m+1} \]

\[ x = \frac{3}{m+1 } \Rightarrow \frac{x}{3} = \frac{1}{m+1 } \quad \text{and since this is true,} \]

\[y =2 + \frac{x}{3} \Rightarrow y = \frac{6+x }{3} \]

$\textbf{Answer: B} $

Question 4

\[ \frac{1+ \displaystyle\frac{x}{x \ – \ 1} }{\displaystyle\frac{1}{x \ – \ 1}+ \displaystyle\frac{1}{x+1} } = x+a \]

If the solution set of the equation is $ \displaystyle -\frac{1}{5} $, what is the value of the real number $a$?

\[
\text{A)} 1 \quad
\text{B) } 2 \quad
\text{C) } 3 \quad
\text{D) } 4 \quad
\text{E) } 5
\]

Solution:

\[ \frac{1+ \displaystyle\frac{x}{x \ – \ 1} }{\displaystyle\frac{1}{x \ – \ 1}+ \displaystyle\frac{1}{x+1} } = x+a \Rightarrow \frac{ \displaystyle\frac{2x \ – \ 1}{x \ – \ 1} }{\displaystyle\frac{2x}{(x \ – \ 1)(x+1)} } =x +a \]

\[ \Rightarrow \frac{(2x \ – \ 1) (x+1)}{2x} = x+a \]

\[\Rightarrow 2x^2+ x \ – \ 1 = 2x^2+ 2ax \]

\[ \Rightarrow x \ – \ 1 = 2ax \]

Since $S =$ $ \{ -\frac{1}{5} \} $, substituting the value $ x= -\frac{1}{5} $ into the equality above gives:

\[ – \frac{1}{5} \;- \;1 = 2a \;(-\frac{1}{5} ) \]

\[\Rightarrow a= 3 \]

$\textbf{Answer: C} $

Question 5

Given that $a \neq b $:

\[ \frac{x}{a} + \frac{a \ – \ 1}{2} = \frac{x}{b} + \frac{b \ – \ 1}{2} \]

What value of $x$ satisfies the equation?

\[
\text{A) } a+b \quad
\text{B) } ab \quad
\text{C) } \frac{a+b}{2} \quad
\text{D) } \frac{-ab}{2} \quad
\text{E) } \frac{ab}{2}
\]

Solution:

\[\frac{x}{a} + \frac{a \ – \ 1}{2} = \frac{x}{b} + \frac{b \ – \ 1}{2} \]

\[ \Rightarrow \frac{x}{a} \;- \; \frac{x}{b} = \frac{b \ – \ 1}{2} \;-\; \frac{a \ – \ 1}{2} \]

\[ \Rightarrow \frac{x (b \ – \ a)}{ab} = \frac{b \ – \ a}{2} \Rightarrow x = \frac{ab}{2} \]

$\textbf{Answer: E} $

Question 6

\[ \displaystyle \frac{6}{4 \ – \ \Large \frac{3}{2 + \frac{1}{x+1}}} = 2 \]

What is the value of $x$?

\[
\text{A) } 0 \quad
\text{B) } 1 \quad
\text{C) } 2 \quad
\text{D) } 3 \quad
\text{E) } 4
\]

Solution:

\[ \frac{6}{4 \ – \ \frac{3}{2 + \frac{1}{x+1}}} = 2 \Rightarrow 4 \ – \ \frac{3}{2 + \frac{1}{x+1}} = 3 \]

\[ \frac{3}{2 + \frac{1}{x+1}} = 1 \Rightarrow 2 + \frac{1}{x+1} = 3 \]

\[ \frac{1}{x+1} = 1 \Rightarrow x+1 = 1 \Rightarrow x = 0 \]

$\textbf{Answer: A} $

Warning:

For $a, b \in R $, in equalities of the form $ax+ b = 0 $:

If $ a= 0 $ and $ b= 0 $, then since $ 0 \cdot x + 0 = 0 $, every real number substituted for $x$ satisfies this equality.
If $ a = 0 $ and $ b \neq 0$, then since $ 0 \cdot x + b=0 $, no real number substituted for $x$ can satisfy this equality.

Question 7

For $a, b \in R $,

\[ \frac{2x \ – \ 1}{3} = \frac{x \ – \ a}{b} \]

given that this equality is satisfied by every real number, what is the sum $a + b $?

\[
\text{A) } 1 \quad
\text{B) } 2 \quad
\text{C) } 3 \quad
\text{D) } 4 \quad
\text{E) } 5
\]

Solution:

\[ \frac{2x \ – \ 1}{3} = \frac{x \ – \ a}{b} \Rightarrow 3 (x \ – \ a) = b (2x \ – \ 1) \]

\[ \Rightarrow (3 \ – \ 2b)x +b \ – \ 3a = 0\]

For this equality to be satisfied by every real number value of $ x $, we must have $ 3 \ – \ 2b =0 $ and $ b \ – \ 3a=0 $. From here,

\[ b = \frac{3}{2 }, \quad a = \frac{1}{2} \] and

\[a + b = \frac{3}{2} + \frac{1}{2} =2 \]

$\textbf{Answer: B} $

Question 8

For $a, b \in R $,

\[ 2ax \ – \ b^2 = \frac{x \ – \ b^2+1}{3} \]

given that there is no real number value that satisfies this equality, what is the value of $a $?

\[
\text{A) } 2 \quad
\text{B) } 1 \quad
\text{C) } \frac{1}{2} \quad
\text{D) } \frac{1}{3} \quad
\text{E) } \frac{1}{6}
\]

Solution:

\[ 2ax \ – \ b^2 = \frac{x \ – \ b^2+1}{3} \Rightarrow 3 (2ax \ – \ b^2) = x \ – \ b^2+1 \]

\[ \Rightarrow (6a – 1)x -2b^2 -1 = 0 \]

For there to be no real number value of $ x $ that satisfies this equality,

\[6a – 1 = 0 \] and \[-2b^2-1 \neq 0 \] must hold. From here,

\[ a = \frac{1}{6} , \quad b^2 \neq -\frac{1}{2} \]

$\textbf{Answer: E} $

Question 9

For $a, b \in R $,

\[ (1 \ – \ a)x + \frac{1}{x} = \frac{bx \ – \ c^2}{x} \]

given that there is no real number value of $x$ that satisfies this equality, what is the sum $a + b $?

\[
\text{A) } 0 \quad
\text{B) } 1 \quad
\text{C) } 2 \quad
\text{D) } 3 \quad
\text{E) } 4
\]

Solution:

\[ (1 \ – \ a)x + \frac{1}{x} = \frac{bx-c^2}{x} \Rightarrow (1 \ – \ a) x^2 +1 = bx \ – \ c^2 \]

\[ \Rightarrow (1 \ – \ a)x^2 \ – \ bx + 1 +c^2 = 0 \]

For there to be no real number value that satisfies this equality,

\[1-a = 0 \] and \[ -b= 0 \] and \[ 1+ c^2 \neq 0 \] must hold.

From here,

$ a=1 $, $- b=0$, and $ 1 +c^2 \neq 0$ must hold.

Thus,

$ a =1 $, $ b=0 $, and $c^2 \neq -1$. Therefore, $ a+b= 1 + 0 = 1 $

$\textbf{Answer: B} $

Question 10

\[ \frac{2x+1}{2} = \frac{3x \ – \ 2}{3} +2 \]

What is the solution set of the equation?

\[
\text{A) } \{ 1,3\} \quad
\text{B) } \{ 0,2\} \quad
\text{C) } \{ -1,2\} \quad
\text{D) } \{ 1\} \quad
\text{E) } \{ \emptyset \} \]

Solution:

\[ \frac{2x+1}{2} = \frac{3x \ – \ 2}{3} +2 \]

\[ \Rightarrow \frac{2x}{2}+ \frac{1}{2} = \frac{3x}{3} – \frac{2}{3} +2 \]

\[ \Rightarrow x \ – \ x + \frac{1}{2} + \frac{2}{3} \ – \ 2 = 0 \]

\[ 0 \cdot x \;- \; \frac{5}{6 } =0 \]

Therefore, $ S = \emptyset $

$\textbf{Answer: E} $

Question 11

\[ 1+ \frac{x \ – \ 5}{2} = \frac{x \ – \ 3}{2} \]

What is the solution set of the equation?

\[
\text{A) } \{ 0\} \quad
\text{B) } \{ -1\} \quad
\text{C) } \{ 1\} \quad
\text{D) } R \quad
\text{E) } \{ \emptyset \}
\]

Solution:

\[1+ \frac{x \ – \ 5}{2} = \frac{x \ – \ 3}{2} \Rightarrow \frac{2 + x \ – \ 5}{2} = \frac{x \ – \ 3}{2} \]

\[\Rightarrow x \ – \ 3 = x \ – \ 3 \]

\[ x\ – \ x \ – \ 3+3 =0 \]

\[0 \cdot x + 0 =0 \]

Therefore, $ S = R $.

$\textbf{Answer: D} $

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