To find the volume of a parallelepiped, we need to find the vectors of the three edges that meet at a point, and then calculate the scalar triple product of these vectors.

Let's denote the vertices as follows:
A: Front bottom right corner (-2,4,5)
B: Front bottom left corner (-2,1,4)
C: Back bottom left corner (-5,1,4)
D: Front top left corner (-2,2,7)

We can form three vectors from these points:
AB: B - A = (-2-(-2), 1-4, 4-5) = (0, -3, -1)
AC: C - A = (-5-(-2), 1-4, 4-5) = (-3, -3, -1)
AD: D - A = (-2-(-2), 2-4, 7-5) = (0, -2, 2)

The volume V of the parallelepiped is given by the absolute value of the scalar triple product of these vectors, which is the determinant of the 3x3 matrix formed by the vectors:

V = |AB.AC.AD| = |0 -3 -1|
|-3 -3 -1|
|0 -2 2|

Calculating the determinant, we get:

V = 0*(-3*-1 - -2*2) - -3*(-3*-1 - 0*2) + -1*(-3*-2 - 0*0)
V = 0*(3 - -4) - -3*(3 - 0) + -1*(-6 - 0)
V = 0*7 - -9 + 6
V = 0 + 9 + 6
V = 15 cubic units

So, the volume of the parallelepiped is 15 cubic units.

Question

To find the volume of a parallelepiped, we need to find the vectors of the three edges that meet at a point, and then calculate the scalar triple product of these vectors.

Let's denote the vertices as follows:
A: Front bottom right corner (-2,4,5)
B: Front bottom left corner (-2,1,4)
C: Back bottom left corner (-5,1,4)
D: Front top left corner (-2,2,7)

We can form three vectors from these points:
AB: B - A = (-2-(-2), 1-4, 4-5) = (0, -3, -1)
AC: C - A = (-5-(-2), 1-4, 4-5) = (-3, -3, -1)
AD: D - A = (-2-(-2), 2-4, 7-5) = (0, -2, 2)

The volume V of the parallelepiped is given by the absolute value of the scalar triple product of these vectors, which is the determinant of the 3x3 matrix formed by the vectors:

V = |AB.AC.AD| = |0 -3 -1|
                 |-3 -3 -1|
                 |0 -2 2|

Calculating the determinant, we get:

V = 0*(-3*-1 - -2*2) - -3*(-3*-1 - 0*2) + -1*(-3*-2 - 0*0)
V = 0*(3 - -4) - -3*(3 - 0) + -1*(-6 - 0)
V = 0*7 - -9 + 6
V = 0 + 9 + 6
V = 15 cubic units

So, the volume of the parallelepiped is 15 cubic units.

Knowee AI · Accepted Answer

To find the volume of a parallelepiped, we need to find the vectors of the three edges that meet at a point, and then calculate the scalar triple product of these vectors.

Let's denote the vertices as follows:
A: Front bottom right corner (-2,4,5)
B: Front bottom left corner (-2,1,4)
C: Back bottom left corner (-5,1,4)
D: Front top left corner (-2,2,7)

We can form three vectors from these points:
AB: B - A = (-2-(-2), 1-4, 4-5) = (0, -3, -1)
AC: C - A = (-5-(-2), 1-4, 4-5) = (-3, -3, -1)
AD: D - A = (-2-(-2), 2-4, 7-5) = (0, -2, 2)

The volume V of the parallelepiped is given by the absolute value of the scalar triple product of these vectors, which is the determinant of the 3x3 matrix formed by the vectors:

V = |AB.AC.AD| = |0 -3 -1|
                 |-3 -3 -1|
                 |0 -2 2|

Calculating the determinant, we get:

V = 0*(-3*-1 - -2*2) - -3*(-3*-1 - 0*2) + -1*(-3*-2 - 0*0)
V = 0*(3 - -4) - -3*(3 - 0) + -1*(-6 - 0)
V = 0*7 - -9 + 6
V = 0 + 9 + 6
V = 15 cubic units

So, the volume of the parallelepiped is 15 cubic units.

Context: Find the volume of the following parallelepiped, given the vertices of the 3d model: Front bottom right corner - (-2,4,5), front bottom left corner - (-2,1,4), back bottom left corner - (-5,1,4), front top left corner - (-2,2,7). use grade 12 knowledge Answer question

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