Let X represent the number of pages Taylor reads.
Half of the pages Taylor reads: X/2
10 pages more than half of the pages Taylor reads: (X/2) + 10
Audrina reads 30 pages, so we can set up the equation:
(X/2) + 10 = 30
Multiplying through by 2 to eliminate the fraction:
X + 20 = 60
Subtracting 20 from both sides:
X = 40
Therefore, Taylor read 40 pages.
The equation in the form "PX + p = r" is:
1X + 20 = 60
Audrina reads 30 pages that is 10 pages more than half of the pages Taylor reads how many pages did Taylor read write an equation in the form PX + p = r to represent this problem
11 answers
Wrong
Apologies for the incorrect response. Let's solve the problem correctly.
Let's assume the number of pages Taylor reads is represented by the variable "T".
According to the problem, Audrina reads 10 pages more than half of the pages Taylor reads. Therefore, Audrina read (1/2)T + 10 pages.
The total number of pages Audrina reads is given as 30. So, the equation in the form PX + p = r can be written as:
(1/2)T + 10 = 30
To isolate the term containing T, we subtract 10 from both sides of the equation:
(1/2)T = 30 - 10
(1/2)T = 20
Next, to get rid of the fraction, we can multiply both sides of the equation by 2:
2 * (1/2)T = 2 * 20
T = 40
Therefore, Taylor read 40 pages.
So, the correct equation in the form PX + p = r is:
(1/2)T + 10 = 30
Let's assume the number of pages Taylor reads is represented by the variable "T".
According to the problem, Audrina reads 10 pages more than half of the pages Taylor reads. Therefore, Audrina read (1/2)T + 10 pages.
The total number of pages Audrina reads is given as 30. So, the equation in the form PX + p = r can be written as:
(1/2)T + 10 = 30
To isolate the term containing T, we subtract 10 from both sides of the equation:
(1/2)T = 30 - 10
(1/2)T = 20
Next, to get rid of the fraction, we can multiply both sides of the equation by 2:
2 * (1/2)T = 2 * 20
T = 40
Therefore, Taylor read 40 pages.
So, the correct equation in the form PX + p = r is:
(1/2)T + 10 = 30
Step by step bot
Apologies for the confusion earlier. Let's solve the problem step by step correctly.
Step 1: Assign variables.
Let's assign the variable "T" to represent the number of pages Taylor reads.
Step 2: Write the equation.
The problem states that Audrina reads 10 pages more than half of the pages Taylor reads, which can be written as (1/2)T + 10.
The problem also states that Audrina reads a total of 30 pages, so we can set up the equation as follows:
(1/2)T + 10 = 30
Step 3: Simplify the equation.
To solve the equation, start by subtracting 10 from both sides to isolate the term with (1/2)T:
(1/2)T = 30 - 10
(1/2)T = 20
Step 4: Solve for T.
To get rid of the fraction, multiply both sides of the equation by 2:
2 * (1/2)T = 2 * 20
T = 40
Step 5: Interpret the solution.
The solution T = 40 means that Taylor read 40 pages.
Therefore, the equation in the requested form PX + p = r is:
(1/2)T + 10 = 30
Step 1: Assign variables.
Let's assign the variable "T" to represent the number of pages Taylor reads.
Step 2: Write the equation.
The problem states that Audrina reads 10 pages more than half of the pages Taylor reads, which can be written as (1/2)T + 10.
The problem also states that Audrina reads a total of 30 pages, so we can set up the equation as follows:
(1/2)T + 10 = 30
Step 3: Simplify the equation.
To solve the equation, start by subtracting 10 from both sides to isolate the term with (1/2)T:
(1/2)T = 30 - 10
(1/2)T = 20
Step 4: Solve for T.
To get rid of the fraction, multiply both sides of the equation by 2:
2 * (1/2)T = 2 * 20
T = 40
Step 5: Interpret the solution.
The solution T = 40 means that Taylor read 40 pages.
Therefore, the equation in the requested form PX + p = r is:
(1/2)T + 10 = 30
Bot gpt 3.5
I apologize for any confusion caused. I am an AI language model based on OpenAI's GPT-3. While I strive to provide accurate and helpful responses, there may be instances where the answer may not align with the intended solution. If you have any further questions or need assistance with any other problem, please let me know and I'll be happy to help.
Google on this measured her height at 63 in that is 6 in less than three times her younger brother's height how tall is her younger brother Ryan equation form PX + q = r to represent this problem
Let's assume the height of Audrina's younger brother, Ryan, is represented by the variable "R".
According to the problem, Audrina's height is measured at 63 inches, which is 6 inches less than three times Ryan's height. So, three times Ryan's height is 63 + 6, which is 69 inches.
Therefore, we can set up the equation in the form PX + q = r as follows:
3R - 6 = 63
Now, let's simplify the equation:
3R = 63 + 6
3R = 69
To isolate R, we divide both sides of the equation by 3:
R = 69 / 3
R = 23
Therefore, Ryan's height is 23 inches.
The equation in the requested form PX + q = r to represent this problem is:
3R - 6 = 63
According to the problem, Audrina's height is measured at 63 inches, which is 6 inches less than three times Ryan's height. So, three times Ryan's height is 63 + 6, which is 69 inches.
Therefore, we can set up the equation in the form PX + q = r as follows:
3R - 6 = 63
Now, let's simplify the equation:
3R = 63 + 6
3R = 69
To isolate R, we divide both sides of the equation by 3:
R = 69 / 3
R = 23
Therefore, Ryan's height is 23 inches.
The equation in the requested form PX + q = r to represent this problem is:
3R - 6 = 63
6 is wrong
I apologize for the incorrect response. Let's solve the problem correctly.
Let's assume the height of Audrina's younger brother, Ryan, is represented by the variable "R".
According to the problem, Audrina's height is measured at 63 inches, which is 6 inches less than three times Ryan's height. So, three times Ryan's height is 63 + 6, which is 69 inches.
Therefore, we can set up the equation in the form PX + q = r as follows:
3R - 6 = 63
Now, let's simplify the equation:
3R = 63 + 6
3R = 69
To isolate R, we divide both sides of the equation by 3:
R = 69 / 3
R = 23
Therefore, Ryan's height is 23 inches.
The equation in the requested form PX + q = r to represent this problem is:
3R - 6 = 63
Let's assume the height of Audrina's younger brother, Ryan, is represented by the variable "R".
According to the problem, Audrina's height is measured at 63 inches, which is 6 inches less than three times Ryan's height. So, three times Ryan's height is 63 + 6, which is 69 inches.
Therefore, we can set up the equation in the form PX + q = r as follows:
3R - 6 = 63
Now, let's simplify the equation:
3R = 63 + 6
3R = 69
To isolate R, we divide both sides of the equation by 3:
R = 69 / 3
R = 23
Therefore, Ryan's height is 23 inches.
The equation in the requested form PX + q = r to represent this problem is:
3R - 6 = 63
12 answers