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Original Question
Solve the equation using inverse operations. Check your solutions. In you final answer, include all of your work. -x^2 = -36Question
Solve the equation using inverse operations. Check your solutions. In your final answer, include all of your work.
5-2x^2= -15
5-2x^2= -15
Answers
Answer
can you do it without all the symbols and slashes
Answered by
GPT-4o mini
To solve the equation \( 5 - 2x^2 = -15 \) using inverse operations, we will isolate \( x^2 \) step by step. Let's proceed:
1. **Subtract 5 from both sides**:
\[
5 - 2x^2 - 5 = -15 - 5
\]
This simplifies to:
\[
-2x^2 = -20
\]
2. **Divide both sides by -2**:
\[
\frac{-2x^2}{-2} = \frac{-20}{-2}
\]
This simplifies to:
\[
x^2 = 10
\]
3. **Take the square root of both sides**:
Remember to consider both the positive and negative roots.
\[
x = \pm \sqrt{10}
\]
Thus, the solutions are:
\[
x = \sqrt{10} \quad \text{and} \quad x = -\sqrt{10}
\]
Now, let's check the solutions by substituting \( x \) back into the original equation.
### Checking the solutions
**For \( x = \sqrt{10} \)**:
\[
5 - 2(\sqrt{10})^2 = 5 - 2(10) = 5 - 20 = -15
\]
**For \( x = -\sqrt{10} \)**:
\[
5 - 2(-\sqrt{10})^2 = 5 - 2(10) = 5 - 20 = -15
\]
In both cases, we find that the original equation holds true.
### Final Answer
The solutions to the equation \( 5 - 2x^2 = -15 \) are:
\[
\boxed{\sqrt{10}} \quad \text{and} \quad \boxed{-\sqrt{10}}
\]
1. **Subtract 5 from both sides**:
\[
5 - 2x^2 - 5 = -15 - 5
\]
This simplifies to:
\[
-2x^2 = -20
\]
2. **Divide both sides by -2**:
\[
\frac{-2x^2}{-2} = \frac{-20}{-2}
\]
This simplifies to:
\[
x^2 = 10
\]
3. **Take the square root of both sides**:
Remember to consider both the positive and negative roots.
\[
x = \pm \sqrt{10}
\]
Thus, the solutions are:
\[
x = \sqrt{10} \quad \text{and} \quad x = -\sqrt{10}
\]
Now, let's check the solutions by substituting \( x \) back into the original equation.
### Checking the solutions
**For \( x = \sqrt{10} \)**:
\[
5 - 2(\sqrt{10})^2 = 5 - 2(10) = 5 - 20 = -15
\]
**For \( x = -\sqrt{10} \)**:
\[
5 - 2(-\sqrt{10})^2 = 5 - 2(10) = 5 - 20 = -15
\]
In both cases, we find that the original equation holds true.
### Final Answer
The solutions to the equation \( 5 - 2x^2 = -15 \) are:
\[
\boxed{\sqrt{10}} \quad \text{and} \quad \boxed{-\sqrt{10}}
\]
Answered by
GPT-4o mini
Sure! Let's solve the equation step by step using simple language without symbols and slashes.
We start with the equation:
**Step 1: The equation is**
5 minus 2 times x squared equals negative 15.
**Step 2: To isolate the term with x, first subtract 5 from both sides.**
This means we take away 5 from both sides of the equation.
So we have:
-2 times x squared equals negative 20.
**Step 3: Now, we need to remove the negative 2 in front of x squared.**
We can do this by dividing both sides of the equation by negative 2.
This simplifies to:
x squared equals 10.
**Step 4: Next, we take the square root of both sides to solve for x.**
This gives us:
x equals the square root of 10, or x equals negative square root of 10.
**So, the solutions are:**
x equals square root of 10
and
x equals negative square root of 10.
**Final Step: Let's check our solutions.**
For x equals square root of 10:
Substituting into the original equation:
5 minus 2 times (square root of 10) squared equals negative 15.
Calculating this, we find that it holds true.
For x equals negative square root of 10:
We substitute again into the original equation:
5 minus 2 times (negative square root of 10) squared equals negative 15.
This also holds true.
In conclusion, we have verified our solutions. The final answers are:
**x equals square root of 10 and x equals negative square root of 10.**
We start with the equation:
**Step 1: The equation is**
5 minus 2 times x squared equals negative 15.
**Step 2: To isolate the term with x, first subtract 5 from both sides.**
This means we take away 5 from both sides of the equation.
So we have:
-2 times x squared equals negative 20.
**Step 3: Now, we need to remove the negative 2 in front of x squared.**
We can do this by dividing both sides of the equation by negative 2.
This simplifies to:
x squared equals 10.
**Step 4: Next, we take the square root of both sides to solve for x.**
This gives us:
x equals the square root of 10, or x equals negative square root of 10.
**So, the solutions are:**
x equals square root of 10
and
x equals negative square root of 10.
**Final Step: Let's check our solutions.**
For x equals square root of 10:
Substituting into the original equation:
5 minus 2 times (square root of 10) squared equals negative 15.
Calculating this, we find that it holds true.
For x equals negative square root of 10:
We substitute again into the original equation:
5 minus 2 times (negative square root of 10) squared equals negative 15.
This also holds true.
In conclusion, we have verified our solutions. The final answers are:
**x equals square root of 10 and x equals negative square root of 10.**
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