Question

What is the equation for the plane illustrated below?

asked Aug 3, 2021 7.0k views

2 Answers

Ask a Question

Yamspog · Answer 1 · 2021-08-09T18:21:47+0000

Answer:

Hence, none of the options presented are valid. The plane is represented by
$3 \cdot x + 3\cdot y + 2\cdot z = 6$ .

Explanation:

The general equation in rectangular form for a 3-dimension plane is represented by:

$a\cdot x + b\cdot y + c\cdot z = d$

Where:

,
,
- Orthogonal inputs.

,
,
,
- Plane constants.

The plane presented in the figure contains the following three points: (2, 0, 0), (0, 2, 0), (0, 0, 3)

For the determination of the resultant equation, three equations of line in three distinct planes orthogonal to each other. That is, expressions for the xy, yz and xz-planes with the resource of the general equation of the line:

xy-plane (2, 0, 0) and (0, 2, 0)

$y = m\cdot x + b$

m = (y_(2)-y_(1))/(x_(2)-x_(1))

Where:

- Slope, dimensionless.

x_(1) ,
x_(2) - Initial and final values for the independent variable, dimensionless.

y_(1) ,
y_(2) - Initial and final values for the dependent variable, dimensionless.

- x-Intercept, dimensionless.

If
x_(1) = 2 ,
y_(1) = 0 ,
x_(2) = 0 and
y_(2) = 2 , then:

Slope

m = (2-0)/(0-2)

m = -1

x-Intercept

$b = y_(1) - m\cdot x_(1)$

$b = 0 -(-1)\cdot (2)$

b = 2

The equation of the line in the xy-plane is
y = -x+2 or
x + y = 2 , which is equivalent to
$3\cdot x + 3\cdot y = 6$ .

yz-plane (0, 2, 0) and (0, 0, 3)

$z = m\cdot y + b$

m = (z_(2)-z_(1))/(y_(2)-y_(1))

Where:

- Slope, dimensionless.

y_(1) ,
y_(2) - Initial and final values for the independent variable, dimensionless.

z_(1) ,
z_(2) - Initial and final values for the dependent variable, dimensionless.

- y-Intercept, dimensionless.

If
y_(1) = 2 ,
z_(1) = 0 ,
y_(2) = 0 and
z_(2) = 3 , then:

Slope

m = (3-0)/(0-2)

m = -(3)/(2)

y-Intercept

$b = z_(1) - m\cdot y_(1)$

$b = 0 -\left(-(3)/(2) \right)\cdot (2)$

b = 3

The equation of the line in the yz-plane is
$z = -(3)/(2)\cdot y+3$ or
$3\cdot y + 2\cdot z = 6$ .

xz-plane (2, 0, 0) and (0, 0, 3)

$z = m\cdot x + b$

m = (z_(2)-z_(1))/(x_(2)-x_(1))

Where:

- Slope, dimensionless.

x_(1) ,
x_(2) - Initial and final values for the independent variable, dimensionless.

z_(1) ,
z_(2) - Initial and final values for the dependent variable, dimensionless.

- z-Intercept, dimensionless.

If
x_(1) = 2 ,
z_(1) = 0 ,
x_(2) = 0 and
z_(2) = 3 , then:

Slope

m = (3-0)/(0-2)

m = -(3)/(2)

x-Intercept

$b = z_(1) - m\cdot x_(1)$

$b = 0 -\left(-(3)/(2) \right)\cdot (2)$

b = 3

The equation of the line in the xz-plane is
$z = -(3)/(2)\cdot x+3$ or
$3\cdot x + 2\cdot z = 6$

After comparing each equation of the line to the definition of the equation of the plane, the following coefficients are obtained:

a = 3 ,
b = 3 ,
c = 2 ,
d = 6

Hence, none of the options presented are valid. The plane is represented by
$3 \cdot x + 3\cdot y + 2\cdot z = 6$ .

0 Comments

Please log in or register to add a comment.

Please log in or register to answer this question.

2 Answers

0 Comments

Please log in or register to add a comment.

0 Comments

Please log in or register to add a comment.

Other Questions