QUESTION IMAGE
Question
- solve the equation \\(\frac{5}{x} - 2 = \frac{2}{x + 3}\\) by using the lcd. select the solution(s).
Step1: Identify the LCD
The denominators are \( x \) and \( x + 3 \), so the least common denominator (LCD) is \( x(x + 3) \).
Step2: Multiply each term by the LCD
Multiply each term in the equation \( \frac{5}{x}-2=\frac{2}{x + 3} \) by \( x(x + 3) \):
\[
\frac{5}{x}\times x(x + 3)-2\times x(x + 3)=\frac{2}{x + 3}\times x(x + 3)
\]
Simplify each term:
- For \( \frac{5}{x}\times x(x + 3) \), the \( x \) cancels out, giving \( 5(x + 3) \).
- For \( -2\times x(x + 3) \), we get \( -2x(x + 3) \).
- For \( \frac{2}{x + 3}\times x(x + 3) \), the \( x + 3 \) cancels out, giving \( 2x \).
So the equation becomes:
\[
5(x + 3)-2x(x + 3)=2x
\]
Step3: Expand and simplify
Expand \( 5(x + 3) \) to \( 5x + 15 \) and \( -2x(x + 3) \) to \( -2x^{2}-6x \):
\[
5x + 15-2x^{2}-6x = 2x
\]
Combine like terms:
\[
-2x^{2}-x + 15 = 2x
\]
Subtract \( 2x \) from both sides to set the equation to zero:
\[
-2x^{2}-3x + 15 = 0
\]
Multiply both sides by \( -1 \) to make the quadratic coefficient positive:
\[
2x^{2}+3x - 15 = 0
\]
Step4: Solve the quadratic equation
Use the quadratic formula \( x=\frac{-b\pm\sqrt{b^{2}-4ac}}{2a} \) for the quadratic equation \( ax^{2}+bx + c = 0 \). Here, \( a = 2 \), \( b = 3 \), and \( c=-15 \).
First, calculate the discriminant \( \Delta=b^{2}-4ac \):
\[
\Delta = 3^{2}-4\times2\times(-15)=9 + 120 = 129
\]
Then, find the solutions:
\[
x=\frac{-3\pm\sqrt{129}}{4}
\]
Wait, this seems wrong. Let's check the expansion again.
Wait, going back to Step 2:
Original equation: \( \frac{5}{x}-2=\frac{2}{x + 3} \)
Multiply by \( x(x + 3) \):
\( 5(x + 3)-2x(x + 3)=2x \)
Expand \( 5(x + 3)=5x + 15 \), \( -2x(x + 3)=-2x^{2}-6x \)
So left side: \( 5x + 15-2x^{2}-6x=-2x^{2}-x + 15 \)
Set equal to \( 2x \):
\( -2x^{2}-x + 15 = 2x \)
Bring all terms to left:
\( -2x^{2}-3x + 15 = 0 \)
Multiply by -1: \( 2x^{2}+3x - 15 = 0 \)
Wait, maybe I made a mistake in the sign when moving terms. Let's do it again:
\( -2x^{2}-x + 15-2x = 0 \)
\( -2x^{2}-3x + 15 = 0 \)
Yes, that's correct. Then quadratic formula:
\( x=\frac{3\pm\sqrt{9 + 120}}{-4}=\frac{3\pm\sqrt{129}}{-4}=\frac{-3\pm\sqrt{129}}{4} \)
Wait, but let's check the original equation for extraneous solutions. Wait, maybe I made a mistake in the multiplication step.
Wait, let's start over.
Original equation: \( \frac{5}{x}-2=\frac{2}{x + 3} \)
LCD is \( x(x + 3) \), \( x
eq0 \) and \( x
eq - 3 \)
Multiply each term by \( x(x + 3) \):
\( 5(x + 3)-2x(x + 3)=2x \)
Expand:
\( 5x + 15-2x^{2}-6x = 2x \)
Combine like terms:
\( -2x^{2}-x + 15 = 2x \)
Bring \( 2x \) to left:
\( -2x^{2}-3x + 15 = 0 \)
Multiply by -1:
\( 2x^{2}+3x - 15 = 0 \)
Discriminant \( D = 9 + 120 = 129 \)
Solutions:
\( x=\frac{-3\pm\sqrt{129}}{4} \)
Wait, but maybe I made a mistake in the problem. Wait, the original equation is \( \frac{5}{x}-2=\frac{2}{x + 3} \). Let's check with \( x = 5 \):
Left side: \( 5/5 - 2=1 - 2=-1 \)
Right side: \( 2/(5 + 3)=2/8 = 0.25 \). Not equal.
Wait, maybe the equation is \( \frac{5}{x}-2=\frac{2}{x + 3} \) with a typo? Or maybe I made a mistake.
Wait, let's try another approach. Let's move all terms to left:
\( \frac{5}{x}-2-\frac{2}{x + 3}=0 \)
Combine fractions:
\( \frac{5(x + 3)-2x(x + 3)-2x}{x(x + 3)}=0 \)
Numerator must be zero:
\( 5(x + 3)-2x(x + 3)-2x = 0 \)
Expand:
\( 5x + 15-2x^{2}-6x - 2x = 0 \)
Combine like terms:
\( -2x^{2}-3x + 15 = 0 \)
Which is the same as before. So the solutions are \( x=\frac{-3\pm\sqrt{129}}{4} \)
Wait, but maybe the original equation is \( \frac{5}{x}-2=\frac{2}{x + 3} \) with a different number. Wait, m…
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The solutions are \( x = \frac{-3+\sqrt{129}}{4} \) and \( x = \frac{-3-\sqrt{129}}{4} \)