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Thread: can you solve this
08-14-2024, 10:25 PM
#1
can you solve this
+
-
= 0
+ + = 24
- = 4
+ + = 24
- = 4
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08-14-2024, 10:34 PM
#2
O + P = pha g g ot
–
08-14-2024, 10:38 PM
#3
8 4 12
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08-14-2024, 10:40 PM
#4
BRB reduced row echelon incoming
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08-14-2024, 10:45 PM
#5
English > Math
08-14-2024, 10:59 PM
#6
Originally Posted By SuperHercules⏩
rept on rc
8 4 12
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08-14-2024, 11:02 PM
#7
Originally Posted By tendies⏩
Lold
O + P = pha g g ot
You must spread some Reputation around before giving it to tendies again.
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08-14-2024, 11:06 PM
#8
8 4 12
tbf you have to have advanced knowledge of mathematics, string theory, cryptography, algebra, geometry, and symmetry to solve this problem so i understand why i was the first to crack this code
tbf you have to have advanced knowledge of mathematics, string theory, cryptography, algebra, geometry, and symmetry to solve this problem so i understand why i was the first to crack this code
08-14-2024, 11:07 PM
#9
Originally Posted By hugecepts⏩
Mirin deduction skills alt brah
8 4 12
tbf you have to have advanced knowledge of mathematics, string theory, cryptography, algebra, geometry, and symmetry to solve this problem so i understand why i was the first to crack this code
tbf you have to have advanced knowledge of mathematics, string theory, cryptography, algebra, geometry, and symmetry to solve this problem so i understand why i was the first to crack this code
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08-14-2024, 11:17 PM
#11
Originally Posted By headturner1⏩
would be impressed if somone reduce a matrix for this lol
BRB reduced row echelon incoming
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08-21-2024, 06:32 PM
#12
I copy and pasted this into chat gpt and within like 2 seconds it gave me the solution:
Certainly! Let's solve the system of equations given:
1. **; ) + : ( - : ) = 0**
2. **; ) + : ( + : ) = 24**
3. **; ) - : ( = 4**
Let's denote:
- ** ** as \( x \)
- ** ** as \( y \)
- ** ** as \( z \)
We can rewrite the equations as:
1. \( x + y - z = 0 \)
2. \( x + y + z = 24 \)
3. \( x - y = 4 \)
### Step-by-Step Solution:
**Step 1: Solve for \( y \) using the third equation**
From the third equation:
\[ x - y = 4 \]
Rearrange to find \( y \) :
\[ y = x - 4 \]
**Step 2: Substitute \( y = x - 4 \) into the first and second equations**
**Substitute into the first equation**:
\[ x + (x - 4) - z = 0 \]
Simplify:
\[ 2x - 4 - z = 0 \]
\[ z = 2x - 4 \]
**Substitute into the second equation**:
\[ x + (x - 4) + z = 24 \]
Substitute \( z = 2x - 4 \):
\[ x + (x - 4) + (2x - 4) = 24 \]
Combine terms:
\[ x + x - 4 + 2x - 4 = 24 \]
\[ 4x - 8 = 24 \]
Add 8 to both sides:
\[ 4x = 32 \]
Divide by 4:
\[ x = 8 \]
**Step 3: Find \( y \) and \( z \)**
Using \( x = 8 \):
\[ y = x - 4 \]
\[ y = 8 - 4 \]
\[ y = 4 \]
Using \( x = 8 \) to find \( z \):
\[ z = 2x - 4 \]
\[ z = 2(8) - 4 \]
\[ z = 16 - 4 \]
\[ z = 12 \]
### Solution
- **; )** \( x = 8 \)
- **: (** \( y = 4 \)
- **: )** \( z = 12 \)
So the values are:
- ** = 8**
- ** = 4**
- ** = 12**
Certainly! Let's solve the system of equations given:
1. **; ) + : ( - : ) = 0**
2. **; ) + : ( + : ) = 24**
3. **; ) - : ( = 4**
Let's denote:
- ** ** as \( x \)
- ** ** as \( y \)
- ** ** as \( z \)
We can rewrite the equations as:
1. \( x + y - z = 0 \)
2. \( x + y + z = 24 \)
3. \( x - y = 4 \)
### Step-by-Step Solution:
**Step 1: Solve for \( y \) using the third equation**
From the third equation:
\[ x - y = 4 \]
Rearrange to find \( y \) :
\[ y = x - 4 \]
**Step 2: Substitute \( y = x - 4 \) into the first and second equations**
**Substitute into the first equation**:
\[ x + (x - 4) - z = 0 \]
Simplify:
\[ 2x - 4 - z = 0 \]
\[ z = 2x - 4 \]
**Substitute into the second equation**:
\[ x + (x - 4) + z = 24 \]
Substitute \( z = 2x - 4 \):
\[ x + (x - 4) + (2x - 4) = 24 \]
Combine terms:
\[ x + x - 4 + 2x - 4 = 24 \]
\[ 4x - 8 = 24 \]
Add 8 to both sides:
\[ 4x = 32 \]
Divide by 4:
\[ x = 8 \]
**Step 3: Find \( y \) and \( z \)**
Using \( x = 8 \):
\[ y = x - 4 \]
\[ y = 8 - 4 \]
\[ y = 4 \]
Using \( x = 8 \) to find \( z \):
\[ z = 2x - 4 \]
\[ z = 2(8) - 4 \]
\[ z = 16 - 4 \]
\[ z = 12 \]
### Solution
- **; )** \( x = 8 \)
- **: (** \( y = 4 \)
- **: )** \( z = 12 \)
So the values are:
- ** = 8**
- ** = 4**
- ** = 12**
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