Find a point on the plane defined by 3x-y+z=8, which is closest to (2,0,5)

Distances

5 Activities

Find a point on the plane defined by 3x−y+z=8,3x-y+z=8,3x−y+z=8, which is closest to (2,0,5)

Answer

I don't know

Prove formula for distance between point and plane

Let a,b,c,d,p,q,r∈Ra,b,c,d,p,q,r\in\mathbb{R}a,b,c,d,p,q,r∈R be constants.  Prove that the formula for the distance between the point Q⃗=(p,q,r)\vec Q=(p,q,r)Q​=(p,q,r) and the plane ax+by+cz=dax+by+cz=dax+by+cz=d is ∣d−ap−bq−cr∣a2+b2+c2\frac{|d-ap-bq-cr|}{\sqrt{a^2+b^2+c^2}}a2+b2+c2​∣d−ap−bq−cr∣​ .

Find the closest distance of point (2,2,2) to the line L by deriving and solving system of linear equations.
L:{𝑥1+x2+𝑥3=2𝑥1−𝑥2−2x3=5L:\begin{cases}
𝑥_1+ x_2 + 𝑥_3 = 2\\
𝑥_1 − 𝑥_2 − 2x_3 = 5

\end{cases}L:{x1​+x2​+x3​=2x1​−x2​−2x3​=5​

Let L1L_1L1​ be a line through the point (1,3,1)(1,3,1)(1,3,1) with direction vector
[112]T\begin{bmatrix}1&1&2\end{bmatrix}^T[1​1​2​]Tand let L2L_2L2​ be a line through the point (2,1,2)(2,1,2)(2,1,2) with direction vector [113]T\begin{bmatrix}1&1&3\end{bmatrix}^T[1​1​3​]T . Find the shortest distance from L1L_1L1​ to L2L_2L2​.

133 - FML 3 - 18.1W e.g. 41

Let P=(−3,−3,−4)\bcb{P = (-3, -3, -4)}P=(−3,−3,−4), Q=(−5,−6,−3)\bcb{Q = (-5,-6,-3)}Q=(−5,−6,−3), R=(−6,−4,−6)\bcb{R = (-6,-4,-6)}R=(−6,−4,−6) and S=(−2,−3,−4)\bcb{S = (-2, -3, -4)}S=(−2,−3,−4). Let l1\bcb{l_1}l1​ be the line passing through P\bcb{P}P and Q\bcb{Q}Q, and let l2\bcb{l_2}l2​ be the line passing through R\bcb{R}R and S\bcb{S}S. Find the distance between R\bcb{R}R and l1\bcb{l_1}l1​. Find the distance between l1\bcb{l_1}l1​ and l2\bcb{l_2}l2​. 

$\tkct{cut from 19.4F}$ Mid $\tkco{ S}$ | 133 - FML 3 - 18.1W e.g. 60.8

 Given the planes
π1 : 4x−3y+z=2\bcb{\pi_1 \, : \, 4x - 3y + z = 2}π1​:4x−3y+z=2 and π2 : x+2y+2z=0\bcb{\pi_2 \, : \, x + 2y + 2z = 0}π2​:x+2y+2z=0, and the lines
L1 : {x=3t+2y=−2t+1z=t, L2 : {x=−2t+1y=t+1z=t+3, L3 : {x=t+3y=−tz=2t+1\bcb{L_1 \, : \, \left\{ \begin{matrix} x & = & 3t + 2 \\ y & = & -2t + 1 \\ z & = & t \end{matrix} \right., ~ 
L_2 \, : \, \left\{ \begin{matrix} x & = & -2t + 1 \\ y & = & t + 1 \\ z & = & t + 3 \end{matrix} \right., ~ 
L_3 \, : \, \left\{ \begin{matrix} x & = & t + 3 \\ y & = & -t \\ z & = & 2t +1 \end{matrix} \right.}L1​:⎩⎨⎧​xyz​===​3t+2−2t+1t​, L2​:⎩⎨⎧​xyz​===​−2t+1t+1t+3​, L3​:⎩⎨⎧​xyz​===​t+3−t2t+1​,

$\tkct{cut from 19.4F}$ Mid $\tkco{ S}$ | 133 - FML 3 - 18.1W e.g. 58.2

Given the vector v⃗=<1,1,2>\bcb{\vec{v} = \left< 1, 1, 2 \right>}v=⟨1,1,2⟩ and the points P1=(0,−1,0)\bcb{P_1 = (0,-1,0)}P1​=(0,−1,0) and P2=(−1,1,0)\bcb{P_2 = (-1,1,0)}P2​=(−1,1,0), find the minimum distance of P2\bcb{P_2}P2​ to the line L\bcb{L}L that is parallel to v⃗\bcb{\vec{v}}v that passes through P1\bcb{P_1}P1​. 

Shortest Distance Between Two Lines, Parallel Edition

Find the shortest distance between the following two lines in R3\mathbb{R}^3R3:
L1={x=1+2ty=3−tz=2+3t,L2={1−4t2+2t−6tL_1 = \begin{cases}
x = 1+2t \\
y = 3-t \\
z = 2+3t
\end{cases}, L_2 = \begin{cases}
1-4t \\
2+2t \\
-6t
\end{cases}L1​=⎩⎨⎧​x=1+2ty=3−tz=2+3t​,L2​=⎩⎨⎧​1−4t2+2t−6t​

Shortest Distance Between Point and Plane

Find the shortest distance between the point (1,2,3)(1,2,3)(1,2,3) and the plane 2x−3y+z=42x-3y+z=42x−3y+z=4.

Shortest Distance Between Point and Line

Find the shortest distance between the point (1,2,3)(1,2,3)(1,2,3) and the line L⃗(t)=<2t+3,t+4,−t−2>\vec{L}(t)=\left<2t+3,t+4,-t-2\right>L(t)=⟨2t+3,t+4,−t−2⟩.

Shortest Distance Between Two Planes

Find the shortest distance between the following two planes in R3\mathbb{R}^3R3:
P1:2x−3y+z=1P2:−6x+9y−3z=5P_1: 2x - 3y + z = 1\\
P_2: -6x + 9y - 3z = 5P1​:2x−3y+z=1P2​:−6x+9y−3z=5

Shortest Distance Between Two Lines, Parallel Edition

Find the shortest distance between the following two lines in R3\mathbb{R}^3R3:
L1={x=1+2ty=3−tz=2+3t,L2={1−4t2+2t−6tL_1 = \begin{cases}
x = 1+2t \\
y = 3-t \\
z = 2+3t
\end{cases}, L_2 = \begin{cases}
1-4t \\
2+2t \\
-6t
\end{cases}L1​=⎩⎨⎧​x=1+2ty=3−tz=2+3t​,L2​=⎩⎨⎧​1−4t2+2t−6t​

Shortest Distance Between Two Lines

Find the shortest distance between the following two lines in R3\mathbb{R}^3R3:
L1={x=1+2ty=3−tz=2+3t,L2={−t2+t−3tL_1 = \begin{cases}
x = 1+2t \\
y = 3-t \\
z = 2+3t
\end{cases}, L_2 = \begin{cases}
-t \\
2+t \\
-3t
\end{cases}L1​=⎩⎨⎧​x=1+2ty=3−tz=2+3t​,L2​=⎩⎨⎧​−t2+t−3t​

Shortest Distance Between Plane and Line

Find the shortest distance between the following plane and line in R3\mathbb{R}^3R3:
P:2x−3y+z=1,L:{x=2t+3y=t+4z=−t−2P: 2x-3y+z=1, L: \begin{cases}
x = 2t+3 \\
y = t + 4 \\
z = -t - 2
\end{cases}P:2x−3y+z=1,L:⎩⎨⎧​x=2t+3y=t+4z=−t−2​

Shortest Distance

Find the shortest distance from the point (3, −1, 2)\left(3,\ -1,\ 2\right)(3, −1, 2) to the plane 2x−y+z=102x-y+z=102x−y+z=10.

Find a point on the plane defined by 3x-y+z=8, which is closest to (2,0,5)

Related Topics

Distances

More Distances Questions:

Prove formula for distance between point and plane

133 - FML 3 - 18.1W e.g. 41

$\tkct{cut from 19.4F}$ Mid $\tkco{ S}$ | 133 - FML 3 - 18.1W e.g. 60.8

$\tkct{cut from 19.4F}$ Mid $\tkco{ S}$ | 133 - FML 3 - 18.1W e.g. 58.2

Shortest Distance Between Two Lines, Parallel Edition

Shortest Distance Between Point and Plane

Shortest Distance Between Point and Line

Shortest Distance Between Two Planes

Shortest Distance Between Two Lines, Parallel Edition

Shortest Distance Between Two Lines

Shortest Distance Between Plane and Line

Shortest Distance