MAT1503 Assignment 4 Solutions 2026
UNISA
ASSIGNMENT 04
Due date: Sunday, 31 August 2025
Total Marks: 40
,Question 1(a)
Given
𝑎⃗ = ⟨2,2,1⟩
𝑏⃗⃗ = ⟨1,0, −2⟩
The projection of 𝑎⃗onto 𝑏⃗⃗is
𝑎⃗ ⋅ 𝑏⃗⃗
proj𝑏⃗⃗ 𝑎⃗ = 𝑏⃗⃗
∥ 𝑏⃗⃗ ∥2
Calculate the dot product:
𝑎⃗ ⋅ 𝑏⃗⃗ = (2)(1) + (2)(0) + (1)(−2)
= 2+0−2
=0
Therefore
0
proj𝑏⃗⃗ 𝑎⃗ = 𝑏⃗⃗
12 + 02 + (−2)2
0
= 𝑏⃗⃗
5
= 0⃗
⃗
Hence
proj𝑏⃗⃗ 𝑎⃗ = ⃗0⃗
Since 𝑤
⃗⃗⃗is supposed to have magnitude √12and be in the direction of this projection,
the statement is impossible because the zero vector has no direction.
, Question 1(b)
Plane 𝚷𝟏
Plane Π1 passes through the origin and is spanned by
𝑢
⃗⃗ = ⟨1,1,0⟩
and
𝑣⃗ = ⟨0,1,1⟩
A normal vector is
𝑛⃗⃗1 = 𝑢
⃗⃗ × 𝑣⃗
𝐢 𝐣 𝐤
=∣ 1 1 0 ∣
0 1 1
= 𝐢(1 ⋅ 1 − 0 ⋅ 1) − 𝐣(1 ⋅ 1 − 0 ⋅ 0) + 𝐤(1 ⋅ 1 − 1 ⋅ 0)
= ⟨1, −1,1⟩
Therefore the equation of Plane Π1 is
𝑥−𝑦+𝑧 =0
Plane 𝚷𝟐
Since
⃗⃗⃗ = ⃗0⃗
𝑤
the normal vector of Plane Π2 is the zero vector.
A plane cannot have a zero normal vector.
Therefore Plane Π2 is not defined.
Consequence
Since Plane Π2 cannot be determined,
• the line of intersection of Π1 and Π2 cannot be found;
• the shortest distance from that line to 𝐿cannot be calculated.
UNISA
ASSIGNMENT 04
Due date: Sunday, 31 August 2025
Total Marks: 40
,Question 1(a)
Given
𝑎⃗ = ⟨2,2,1⟩
𝑏⃗⃗ = ⟨1,0, −2⟩
The projection of 𝑎⃗onto 𝑏⃗⃗is
𝑎⃗ ⋅ 𝑏⃗⃗
proj𝑏⃗⃗ 𝑎⃗ = 𝑏⃗⃗
∥ 𝑏⃗⃗ ∥2
Calculate the dot product:
𝑎⃗ ⋅ 𝑏⃗⃗ = (2)(1) + (2)(0) + (1)(−2)
= 2+0−2
=0
Therefore
0
proj𝑏⃗⃗ 𝑎⃗ = 𝑏⃗⃗
12 + 02 + (−2)2
0
= 𝑏⃗⃗
5
= 0⃗
⃗
Hence
proj𝑏⃗⃗ 𝑎⃗ = ⃗0⃗
Since 𝑤
⃗⃗⃗is supposed to have magnitude √12and be in the direction of this projection,
the statement is impossible because the zero vector has no direction.
, Question 1(b)
Plane 𝚷𝟏
Plane Π1 passes through the origin and is spanned by
𝑢
⃗⃗ = ⟨1,1,0⟩
and
𝑣⃗ = ⟨0,1,1⟩
A normal vector is
𝑛⃗⃗1 = 𝑢
⃗⃗ × 𝑣⃗
𝐢 𝐣 𝐤
=∣ 1 1 0 ∣
0 1 1
= 𝐢(1 ⋅ 1 − 0 ⋅ 1) − 𝐣(1 ⋅ 1 − 0 ⋅ 0) + 𝐤(1 ⋅ 1 − 1 ⋅ 0)
= ⟨1, −1,1⟩
Therefore the equation of Plane Π1 is
𝑥−𝑦+𝑧 =0
Plane 𝚷𝟐
Since
⃗⃗⃗ = ⃗0⃗
𝑤
the normal vector of Plane Π2 is the zero vector.
A plane cannot have a zero normal vector.
Therefore Plane Π2 is not defined.
Consequence
Since Plane Π2 cannot be determined,
• the line of intersection of Π1 and Π2 cannot be found;
• the shortest distance from that line to 𝐿cannot be calculated.