1
You visited us
1
times! Enjoying our articles?
Unlock Full Access!
Byju's Answer
Standard XII
Mathematics
Angle between Pair of Straight Lines
Find the angl...
Question
Find the angle between the planes.
(i) 2x − y + z = 4 and x + y + 2z = 3
(ii) x + y − 2z = 3 and 2x − 2y + z = 5
(iii) x − y + z = 5 and x + 2y + z = 9
(iv) 2x − 3y + 4z = 1 and − x + y = 4
(v) 2x + y − 2z = 5 and 3x − 6y − 2z = 7
Open in App
Solution
i
We know that the angle between the planes
a
1
x
+
b
1
y
+
c
1
z
+
d
1
=
0
and
a
2
x
+
b
2
y
+
c
2
z
+
d
2
=
0
is given by
cos
θ
=
a
1
a
2
+
b
1
b
2
+
c
1
c
2
a
1
2
+
b
1
2
+
c
1
2
a
2
2
+
b
2
2
+
c
2
2
So, the angle between
2
x
-
y
+
z
=
4
and
x
+
y
+
2
z
=
3
is given by
cos
θ
=
2
1
+
-
1
1
+
1
2
2
2
+
-
1
2
+
1
2
1
2
+
1
2
+
2
2
=
2
-
1
+
2
4
+
1
+
1
1
+
1
+
4
=
3
6
6
=
3
6
=
1
2
⇒
θ
=
cos
-
1
1
2
=
π
3
i
i
We know that the angle between the planes
a
1
x
+
b
1
y
+
c
1
z
+
d
1
=
0
and
a
2
x
+
b
2
y
+
c
2
z
+
d
2
=
0
is given by
cos
θ
=
a
1
a
2
+
b
1
b
2
+
c
1
c
2
a
1
2
+
b
1
2
+
c
1
2
a
2
2
+
b
2
2
+
c
2
2
So, the angle between
x
+
y
-
2
z
=
3
and 2
x
-
2
y
+
z
=
5
is given by
cos
θ
=
1
2
+
1
-
2
+
-
2
1
1
2
+
1
2
+
-
2
2
2
2
+
-
2
2
+
1
2
=
2
-
2
-
2
1
+
1
+
4
4
+
4
+
1
=
-
2
6
9
=
-
2
3
6
⇒
θ
=
cos
-
1
-
2
3
6
i
i
i
We know that the angle between the planes
a
1
x
+
b
1
y
+
c
1
z
+
d
1
=
0
and
a
2
x
+
b
2
y
+
c
2
z
+
d
2
=
0
is given by
cos
θ
=
a
1
a
2
+
b
1
b
2
+
c
1
c
2
a
1
2
+
b
1
2
+
c
1
2
a
2
2
+
b
2
2
+
c
2
2
So, the angle between
x
-
y
+
z
=
5
and
x
+
2
y
+
z
=
9
is given by
cos
θ
=
1
1
+
-
1
2
+
1
1
1
2
+
-
1
2
+
1
2
1
2
+
2
2
+
1
2
=
1
-
2
+
1
1
+
1
+
1
1
+
4
+
1
=
0
3
6
=
0
⇒
θ
=
cos
-
1
0
=
π
2
i
v
We know that the angle between the planes
a
1
x
+
b
1
y
+
c
1
z
+
d
1
=
0
and
a
2
x
+
b
2
y
+
c
2
z
+
d
2
=
0
is given by
cos
θ
=
a
1
a
2
+
b
1
b
2
+
c
1
c
2
a
1
2
+
b
1
2
+
c
1
2
a
2
2
+
b
2
2
+
c
2
2
So, the angle between 2
x
-
3
y
+
4
z
=
1
and -
x
+
y
+
0
z
=
4
is given by
cos
θ
=
2
-
1
+
-
3
1
+
4
0
2
2
+
-
3
2
+
4
2
-
1
2
+
1
2
+
0
2
=
-
2
-
3
+
0
4
+
9
+
16
1
+
1
+
0
=
-
5
29
2
=
-
5
58
⇒
θ
=
cos
-
1
-
5
58
v
We know that the angle between the planes
a
1
x
+
b
1
y
+
c
1
z
+
d
1
=
0
and
a
2
x
+
b
2
y
+
c
2
z
+
d
2
=
0
is given by
cos
θ
=
a
1
a
2
+
b
1
b
2
+
c
1
c
2
a
1
2
+
b
1
2
+
c
1
2
a
2
2
+
b
2
2
+
c
2
2
So, the angle between 2
x
+
y
-
2
z
=
5
and 3
x
-
6
y
-
2
z
=
7
is given by
cos
θ
=
2
3
+
1
-
6
+
-
2
-
2
2
2
+
1
2
+
-
2
2
3
2
+
-
6
2
+
-
2
2
=
6
-
6
+
4
4
+
1
+
4
9
+
36
+
4
=
4
3
7
=
4
21
⇒
θ
=
cos
-
1
4
21
Suggest Corrections
0
Similar questions
Q.
Find the angle between the planes.
(i) 2x − y + z = 4 and x + y + 2z = 3
(ii) x + y − 2z = 3 and 2x − 2y + z = 5
(iii) x − y + z = 5 and x + 2y + z = 9
(iv) 2x − 3y + 4z = 1 and − x + y = 4
(v) 2x + y − 2z = 5 and 3x − 6y − 2z = 7
Q.
If
Δ
1
=
∣
∣ ∣
∣
x
−
y
−
z
2
x
2
x
2
y
y
−
z
−
x
2
y
2
z
2
z
z
−
x
−
y
∣
∣ ∣
∣
and
Δ
2
=
∣
∣ ∣
∣
x
+
y
+
2
z
x
y
z
y
+
z
+
2
x
y
z
x
z
+
x
+
2
y
∣
∣ ∣
∣
then
Q.
Show that each of the following systems of linear equations is consistent and also find their solutions:
(i) 6x + 4y = 2
9x + 6y = 3
(ii) 2x + 3y = 5
6x + 9y = 15
(iii) 5x + 3y + 7z = 4
3x + 26y + 2z = 9
7x + 2y + 10z = 5
(iv) x − y + z = 3
2x + y − z = 2
−x −2y + 2z = 1
(v) x + y + z = 6
x + 2y + 3z = 14
x + 4y + 7z = 30
(vi) 2x + 2y − 2z = 1
4x + 4y − z = 2
6x + 6y + 2z = 3
Q.
Add:
2
x
+
y
+
z
;
−
x
+
2
y
+
2
z
and
x
−
y
−
z
Q.
Solve:
x
−
y
+
z
=
6
;
x
−
2
y
−
2
z
=
5
and
2
x
+
y
−
3
z
=
1
View More
Join BYJU'S Learning Program
Grade/Exam
1st Grade
2nd Grade
3rd Grade
4th Grade
5th Grade
6th grade
7th grade
8th Grade
9th Grade
10th Grade
11th Grade
12th Grade
Submit
Related Videos
MATHEMATICS
Watch in App
Explore more
Angle between Pair of Straight Lines
Standard XII Mathematics
Join BYJU'S Learning Program
Grade/Exam
1st Grade
2nd Grade
3rd Grade
4th Grade
5th Grade
6th grade
7th grade
8th Grade
9th Grade
10th Grade
11th Grade
12th Grade
Submit
AI Tutor
Textbooks
Question Papers
Install app