Examine the six different equations that follow. Determine which pairs of equations
have one solution, no solution, and infinite solutions.
• Put a circle around the two equations that have infinite solutions.
• Put a square around the two equations that have no solution.
• Underline the two equations that have one solution.
9 answers
Without the six different equations provided, I cannot examine them or determine which pairs have one solution, no solution, or infinite solutions to follow the instructions given. Please provide the equations so that I can perform the required analysis.
Examine the six different equations that follow. Determine which pairs of equations
have one solution, no solution, and infinite solutions.
• Put a circle around the two equations that have infinite solutions.
• Put a square around the two equations that have no solution.
• Underline the two equations that have one solution.
2x+3=2x+7
7x+3=7x+3
4x+22=8x+10
5x+5=5x+4
3x+18=5x+8
3(4x+8)=4(3x+6
have one solution, no solution, and infinite solutions.
• Put a circle around the two equations that have infinite solutions.
• Put a square around the two equations that have no solution.
• Underline the two equations that have one solution.
2x+3=2x+7
7x+3=7x+3
4x+22=8x+10
5x+5=5x+4
3x+18=5x+8
3(4x+8)=4(3x+6
Let's analyze the six equations one by one:
1) 2x+3=2x+7
This equation is a contradiction because both sides are equal to 2x, but the constant terms on each side are different (3 and 7). Therefore, this equation has no solution. [Square]
2) 7x+3=7x+3
This equation is an identity because both sides are equal for all values of x. Thus, it has an infinite number of solutions. [Circle]
3) 4x+22=8x+10
Simplifying both sides, we have: 4x - 8x = 10 - 22 => -4x = -12 => x = 3.
This equation has only one solution. [Underline]
4) 5x+5=5x+4
Simplifying both sides, we have: 5 = 4.
This equation is a contradiction because it states that 5 is equal to 4, which is not true. Therefore, it has no solution. [Square]
5) 3x+18=5x+8
Simplifying both sides, we have: 3x - 5x = 8 - 18 => -2x = -10 => x = 5.
This equation has only one solution. [Underline]
6) 3(4x+8)=4(3x+6)
Distributing on both sides, we have: 12x + 24 = 12x + 24.
This equation is an identity because both sides are equal for all values of x. Thus, it has an infinite number of solutions. [Circle]
In summary, the pairs of equations with the given solutions are:
- Equations 1 and 4 have no solution. [Square]
- Equations 2 and 6 have an infinite number of solutions. [Circle]
- Equations 3 and 5 have one solution. [Underline]
1) 2x+3=2x+7
This equation is a contradiction because both sides are equal to 2x, but the constant terms on each side are different (3 and 7). Therefore, this equation has no solution. [Square]
2) 7x+3=7x+3
This equation is an identity because both sides are equal for all values of x. Thus, it has an infinite number of solutions. [Circle]
3) 4x+22=8x+10
Simplifying both sides, we have: 4x - 8x = 10 - 22 => -4x = -12 => x = 3.
This equation has only one solution. [Underline]
4) 5x+5=5x+4
Simplifying both sides, we have: 5 = 4.
This equation is a contradiction because it states that 5 is equal to 4, which is not true. Therefore, it has no solution. [Square]
5) 3x+18=5x+8
Simplifying both sides, we have: 3x - 5x = 8 - 18 => -2x = -10 => x = 5.
This equation has only one solution. [Underline]
6) 3(4x+8)=4(3x+6)
Distributing on both sides, we have: 12x + 24 = 12x + 24.
This equation is an identity because both sides are equal for all values of x. Thus, it has an infinite number of solutions. [Circle]
In summary, the pairs of equations with the given solutions are:
- Equations 1 and 4 have no solution. [Square]
- Equations 2 and 6 have an infinite number of solutions. [Circle]
- Equations 3 and 5 have one solution. [Underline]
Plug a few points into the original equations and check to show that they can have no
solution. Explain your work
solution. Explain your work
To show that the equations with no solution do not have any valid solutions, we can plug a few points into the original equations and demonstrate that they do not satisfy the equations.
Let's consider equations 1 and 4, which have no solution:
Equation 1: 2x + 3 = 2x + 7
Let's try substituting x = 1 into equation 1:
2(1) + 3 = 2(1) + 7
2 + 3 = 2 + 7
5 = 9
As we can see, when we substitute x = 1 into the equation, we do not get a true statement. The left side of the equation is not equal to the right side. Therefore, x = 1 is not a solution.
Now let's consider equation 4: 5x + 5 = 5x + 4
Again, let's substitute x = 1 to check if it satisfies the equation:
5(1) + 5 = 5(1) + 4
5 + 5 = 5 + 4
10 = 9
Similarly, plugging in x = 1 into equation 4 leads to an untrue statement. The left side of the equation is not equal to the right side, indicating that x = 1 is not a valid solution.
By checking a few points and observing that they do not satisfy the equations, we can conclude that equations 1 and 4 have no solution.
Let's consider equations 1 and 4, which have no solution:
Equation 1: 2x + 3 = 2x + 7
Let's try substituting x = 1 into equation 1:
2(1) + 3 = 2(1) + 7
2 + 3 = 2 + 7
5 = 9
As we can see, when we substitute x = 1 into the equation, we do not get a true statement. The left side of the equation is not equal to the right side. Therefore, x = 1 is not a solution.
Now let's consider equation 4: 5x + 5 = 5x + 4
Again, let's substitute x = 1 to check if it satisfies the equation:
5(1) + 5 = 5(1) + 4
5 + 5 = 5 + 4
10 = 9
Similarly, plugging in x = 1 into equation 4 leads to an untrue statement. The left side of the equation is not equal to the right side, indicating that x = 1 is not a valid solution.
By checking a few points and observing that they do not satisfy the equations, we can conclude that equations 1 and 4 have no solution.
Consider the two equations that you underlined, which form a system with one
solution. Solve the equations.
solution. Solve the equations.
Let's solve the two equations that were underlined, which indicate a system with one solution.
Equation 3: 4x + 22 = 8x + 10
Equation 5: 3x + 18 = 5x + 8
Solving equation 3 step-by-step:
4x + 22 = 8x + 10
Subtract 4x from both sides:
22 = 4x + 10
Subtract 10 from both sides:
12 = 4x
Divide both sides by 4:
3 = x
So, equation 3 has a solution x = 3.
Now, let's solve equation 5 step-by-step:
3x + 18 = 5x + 8
Subtract 3x from both sides:
18 = 2x + 8
Subtract 8 from both sides:
10 = 2x
Divide both sides by 2:
5 = x
Thus, equation 5 has a solution x = 5.
Therefore, the system formed by equations 3 and 5 has a unique solution, with x = 3 and x = 5 satisfying each equation respectively.
Equation 3: 4x + 22 = 8x + 10
Equation 5: 3x + 18 = 5x + 8
Solving equation 3 step-by-step:
4x + 22 = 8x + 10
Subtract 4x from both sides:
22 = 4x + 10
Subtract 10 from both sides:
12 = 4x
Divide both sides by 4:
3 = x
So, equation 3 has a solution x = 3.
Now, let's solve equation 5 step-by-step:
3x + 18 = 5x + 8
Subtract 3x from both sides:
18 = 2x + 8
Subtract 8 from both sides:
10 = 2x
Divide both sides by 2:
5 = x
Thus, equation 5 has a solution x = 5.
Therefore, the system formed by equations 3 and 5 has a unique solution, with x = 3 and x = 5 satisfying each equation respectively.
Now try writing and solving your own systems of linear equations: one with infinite
solutions, one with no solution, and one with one solution. Write a real-world scenario
that goes with at least one system of equations. Show your wor
solutions, one with no solution, and one with one solution. Write a real-world scenario
that goes with at least one system of equations. Show your wor
Sure! Let me provide you with three systems of linear equations, each with a different number of solutions. I will also include a real-world scenario for at least one of the systems.
1) System with Infinite Solutions:
Equation 1: 2x + 3y = 8
Equation 2: 4x + 6y = 16
To show that this system has infinite solutions, we can notice that Equation 2 is simply a multiple of Equation 1. If we multiply Equation 1 by 2, we get Equation 2. Therefore, any values of x and y that satisfy Equation 1 will also satisfy Equation 2. Hence, this system has infinitely many solutions.
2) System with No Solution:
Equation 1: 3x + 2y = 10
Equation 2: 6x + 4y = 8
To demonstrate that this system has no solution, we can start by simplifying Equation 2. By dividing Equation 2 by 2, we obtain 3x + 2y = 4. Comparing this equation to Equation 1, we can see that the coefficients of x and y are different, meaning the lines represented by the two equations are parallel and will never intersect. Thus, this system does not have a solution.
3) System with One Solution (Real-world Scenario):
Equation 1: 2x + 3y = 12
Equation 2: 4x - y = 8
Imagine you work at a lemonade stand where you sell cups of lemonade and cookies. Equation 1 represents the revenue from selling cups of lemonade (at $2 each) and cookies (at $3 each), which totals $12. Equation 2 represents the cost of ingredients for making lemonade and cookies (for each cup of lemonade and one cookie), which totals $8.
To find the number of cups of lemonade (x) and cookies (y) sold, we can solve this system of equations.
We can use the substitution method:
From Equation 2, we isolate y:
y = 4x - 8
Now we substitute this value of y into Equation 1:
2x + 3(4x - 8) = 12
2x + 12x - 24 = 12
14x = 36
x = 36/14
x = 18/7
Now we substitute the value of x into Equation 2 to find y:
4(18/7) - y = 8
72/7 - y = 8
y = 72/7 - 8
y = (72 - 56)/7
y = 16/7
Therefore, the system has one solution: x = 18/7 and y = 16/7, representing selling 18/7 cups of lemonade and 16/7 cookies at the lemonade stand, respectively.
1) System with Infinite Solutions:
Equation 1: 2x + 3y = 8
Equation 2: 4x + 6y = 16
To show that this system has infinite solutions, we can notice that Equation 2 is simply a multiple of Equation 1. If we multiply Equation 1 by 2, we get Equation 2. Therefore, any values of x and y that satisfy Equation 1 will also satisfy Equation 2. Hence, this system has infinitely many solutions.
2) System with No Solution:
Equation 1: 3x + 2y = 10
Equation 2: 6x + 4y = 8
To demonstrate that this system has no solution, we can start by simplifying Equation 2. By dividing Equation 2 by 2, we obtain 3x + 2y = 4. Comparing this equation to Equation 1, we can see that the coefficients of x and y are different, meaning the lines represented by the two equations are parallel and will never intersect. Thus, this system does not have a solution.
3) System with One Solution (Real-world Scenario):
Equation 1: 2x + 3y = 12
Equation 2: 4x - y = 8
Imagine you work at a lemonade stand where you sell cups of lemonade and cookies. Equation 1 represents the revenue from selling cups of lemonade (at $2 each) and cookies (at $3 each), which totals $12. Equation 2 represents the cost of ingredients for making lemonade and cookies (for each cup of lemonade and one cookie), which totals $8.
To find the number of cups of lemonade (x) and cookies (y) sold, we can solve this system of equations.
We can use the substitution method:
From Equation 2, we isolate y:
y = 4x - 8
Now we substitute this value of y into Equation 1:
2x + 3(4x - 8) = 12
2x + 12x - 24 = 12
14x = 36
x = 36/14
x = 18/7
Now we substitute the value of x into Equation 2 to find y:
4(18/7) - y = 8
72/7 - y = 8
y = 72/7 - 8
y = (72 - 56)/7
y = 16/7
Therefore, the system has one solution: x = 18/7 and y = 16/7, representing selling 18/7 cups of lemonade and 16/7 cookies at the lemonade stand, respectively.
4 answers