Question
Triangle PQR has vertices P(0,0), Q((9.42,0), and R(6,2.4). Triangle PQS have vertices P(0,0), Q(9.42,0), and S(5,y). The area of Triangle PQS is three times the area of the triangle PQR. Compute the value of y, the missing coordinate of vertex S.
Y=7.2
Y=4.71
Y=18
Y=0.8
Y=7.2
Y=4.71
Y=18
Y=0.8
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Answered by
GPT-4o mini
The area \( A \) of a triangle with vertices \((x_1, y_1)\), \((x_2, y_2)\), and \((x_3, y_3)\) can be calculated using the formula:
\[
A = \frac{1}{2} \left| x_1(y_2-y_3) + x_2(y_3-y_1) + x_3(y_1-y_2) \right|
\]
### Step 1: Area of Triangle PQR
For triangle PQR with vertices \( P(0,0) \), \( Q(9.42, 0) \), and \( R(6, 2.4) \):
- Coordinates:
- \( (x_1, y_1) = (0, 0) \)
- \( (x_2, y_2) = (9.42, 0) \)
- \( (x_3, y_3) = (6, 2.4) \)
Using the area formula:
\[
A_{PQR} = \frac{1}{2} \left| 0(0 - 2.4) + 9.42(2.4 - 0) + 6(0 - 0) \right|
\]
Calculating it step by step:
\[
A_{PQR} = \frac{1}{2} \left| 0 + 9.42 \cdot 2.4 + 0 \right|
\]
\[
A_{PQR} = \frac{1}{2} \left| 22.608 \right| = 11.304
\]
### Step 2: Area of Triangle PQS
For triangle PQS with vertices \( P(0,0) \), \( Q(9.42, 0) \), and \( S(5, y) \):
- Coordinates:
- \( (x_1, y_1) = (0, 0) \)
- \( (x_2, y_2) = (9.42, 0) \)
- \( (x_3, y_3) = (5, y) \)
Using the area formula:
\[
A_{PQS} = \frac{1}{2} \left| 0(0 - y) + 9.42(y - 0) + 5(0 - 0) \right|
\]
Calculating it step by step:
\[
A_{PQS} = \frac{1}{2} \left| 9.42y \right| = \frac{9.42y}{2}
\]
### Step 3: Set Up the Equation
We know the area of triangle PQS is three times the area of triangle PQR:
\[
A_{PQS} = 3 \cdot A_{PQR}
\]
Substituting the areas:
\[
\frac{9.42y}{2} = 3 \cdot 11.304
\]
Calculating \( 3 \cdot 11.304 \):
\[
3 \cdot 11.304 = 33.912
\]
Now, equate:
\[
\frac{9.42y}{2} = 33.912
\]
To eliminate the fraction, multiply both sides by 2:
\[
9.42y = 67.824
\]
### Step 4: Solve for y
Now, divide both sides by 9.42:
\[
y = \frac{67.824}{9.42}
\]
Calculating \( y \):
\[
y \approx 7.19 \text{ (rounded to two decimal places)}
\]
The value of \( y \) closest to this calculation in the provided options is:
\[
\boxed{7.2}
\]
\[
A = \frac{1}{2} \left| x_1(y_2-y_3) + x_2(y_3-y_1) + x_3(y_1-y_2) \right|
\]
### Step 1: Area of Triangle PQR
For triangle PQR with vertices \( P(0,0) \), \( Q(9.42, 0) \), and \( R(6, 2.4) \):
- Coordinates:
- \( (x_1, y_1) = (0, 0) \)
- \( (x_2, y_2) = (9.42, 0) \)
- \( (x_3, y_3) = (6, 2.4) \)
Using the area formula:
\[
A_{PQR} = \frac{1}{2} \left| 0(0 - 2.4) + 9.42(2.4 - 0) + 6(0 - 0) \right|
\]
Calculating it step by step:
\[
A_{PQR} = \frac{1}{2} \left| 0 + 9.42 \cdot 2.4 + 0 \right|
\]
\[
A_{PQR} = \frac{1}{2} \left| 22.608 \right| = 11.304
\]
### Step 2: Area of Triangle PQS
For triangle PQS with vertices \( P(0,0) \), \( Q(9.42, 0) \), and \( S(5, y) \):
- Coordinates:
- \( (x_1, y_1) = (0, 0) \)
- \( (x_2, y_2) = (9.42, 0) \)
- \( (x_3, y_3) = (5, y) \)
Using the area formula:
\[
A_{PQS} = \frac{1}{2} \left| 0(0 - y) + 9.42(y - 0) + 5(0 - 0) \right|
\]
Calculating it step by step:
\[
A_{PQS} = \frac{1}{2} \left| 9.42y \right| = \frac{9.42y}{2}
\]
### Step 3: Set Up the Equation
We know the area of triangle PQS is three times the area of triangle PQR:
\[
A_{PQS} = 3 \cdot A_{PQR}
\]
Substituting the areas:
\[
\frac{9.42y}{2} = 3 \cdot 11.304
\]
Calculating \( 3 \cdot 11.304 \):
\[
3 \cdot 11.304 = 33.912
\]
Now, equate:
\[
\frac{9.42y}{2} = 33.912
\]
To eliminate the fraction, multiply both sides by 2:
\[
9.42y = 67.824
\]
### Step 4: Solve for y
Now, divide both sides by 9.42:
\[
y = \frac{67.824}{9.42}
\]
Calculating \( y \):
\[
y \approx 7.19 \text{ (rounded to two decimal places)}
\]
The value of \( y \) closest to this calculation in the provided options is:
\[
\boxed{7.2}
\]
Answered by
GPT-4o mini
Let’s double-check the calculations step-by-step to ensure accuracy.
### Step 1: Area of Triangle PQR
The vertices are:
- \( P(0,0) \)
- \( Q(9.42, 0) \)
- \( R(6, 2.4) \)
Using the area formula for triangle \( A = \frac{1}{2} \left| x_1(y_2-y_3) + x_2(y_3-y_1) + x_3(y_1-y_2) \right| \):
\[
A_{PQR} = \frac{1}{2} \left| 0(0 - 2.4) + 9.42(2.4 - 0) + 6(0 - 0) \right|
\]
Calculating the area:
\[
= \frac{1}{2} \left| 0 + 9.42 \cdot 2.4 + 0 \right|
\]
\[
= \frac{1}{2} \left| 22.608 \right| = 11.304
\]
### Step 2: Area of Triangle PQS
The vertices are:
- \( P(0,0) \)
- \( Q(9.42, 0) \)
- \( S(5, y) \)
Using the area formula:
\[
A_{PQS} = \frac{1}{2} \left| 0(0 - y) + 9.42(y - 0) + 5(0 - 0) \right|
\]
\[
= \frac{1}{2} \left| 9.42y \right| = \frac{9.42y}{2}
\]
### Step 3: Relate the Areas
We set the area of triangle PQS to be three times the area of triangle PQR:
\[
\frac{9.42y}{2} = 3 \cdot 11.304
\]
Calculating the right-hand side:
\[
3 \cdot 11.304 = 33.912
\]
Setting the equations equal:
\[
\frac{9.42y}{2} = 33.912
\]
Multiply both sides by 2 to eliminate the fraction:
\[
9.42y = 67.824
\]
### Step 4: Solve for \( y \)
Now, divide both sides by 9.42:
\[
y = \frac{67.824}{9.42}
\]
Calculating \( y \):
\[
y \approx 7.19
\]
### Result from Previous Calculation
Thus, \( y \approx 7.19 \), which rounds to \( 7.2 \).
**Final Confirmation**: The provided options are \( 7.2, 4.71, 18, 0.8 \). The value of \( y \) that we calculated is \( 7.2 \), confirming that the answer is indeed:
\[
\boxed{7.2}
\]
Thank you for your patience, and the calculations confirm that \( y = 7.2 \) is correct.
### Step 1: Area of Triangle PQR
The vertices are:
- \( P(0,0) \)
- \( Q(9.42, 0) \)
- \( R(6, 2.4) \)
Using the area formula for triangle \( A = \frac{1}{2} \left| x_1(y_2-y_3) + x_2(y_3-y_1) + x_3(y_1-y_2) \right| \):
\[
A_{PQR} = \frac{1}{2} \left| 0(0 - 2.4) + 9.42(2.4 - 0) + 6(0 - 0) \right|
\]
Calculating the area:
\[
= \frac{1}{2} \left| 0 + 9.42 \cdot 2.4 + 0 \right|
\]
\[
= \frac{1}{2} \left| 22.608 \right| = 11.304
\]
### Step 2: Area of Triangle PQS
The vertices are:
- \( P(0,0) \)
- \( Q(9.42, 0) \)
- \( S(5, y) \)
Using the area formula:
\[
A_{PQS} = \frac{1}{2} \left| 0(0 - y) + 9.42(y - 0) + 5(0 - 0) \right|
\]
\[
= \frac{1}{2} \left| 9.42y \right| = \frac{9.42y}{2}
\]
### Step 3: Relate the Areas
We set the area of triangle PQS to be three times the area of triangle PQR:
\[
\frac{9.42y}{2} = 3 \cdot 11.304
\]
Calculating the right-hand side:
\[
3 \cdot 11.304 = 33.912
\]
Setting the equations equal:
\[
\frac{9.42y}{2} = 33.912
\]
Multiply both sides by 2 to eliminate the fraction:
\[
9.42y = 67.824
\]
### Step 4: Solve for \( y \)
Now, divide both sides by 9.42:
\[
y = \frac{67.824}{9.42}
\]
Calculating \( y \):
\[
y \approx 7.19
\]
### Result from Previous Calculation
Thus, \( y \approx 7.19 \), which rounds to \( 7.2 \).
**Final Confirmation**: The provided options are \( 7.2, 4.71, 18, 0.8 \). The value of \( y \) that we calculated is \( 7.2 \), confirming that the answer is indeed:
\[
\boxed{7.2}
\]
Thank you for your patience, and the calculations confirm that \( y = 7.2 \) is correct.
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