For Exercises 9-32, solve the system. If a system has one unique solution, write the solution set. Otherwise, determine the number of solutions to the system, and determine whether the system is inconsistent, or the equations are dependent. (See Examples 2-5) x + 7 2 y + 1 2 z = 4 3 4 x + y + 1 2 z = − 1 1 10 x − 2 5 y − 3 10 z = 1
For Exercises 9-32, solve the system. If a system has one unique solution, write the solution set. Otherwise, determine the number of solutions to the system, and determine whether the system is inconsistent, or the equations are dependent. (See Examples 2-5) x + 7 2 y + 1 2 z = 4 3 4 x + y + 1 2 z = − 1 1 10 x − 2 5 y − 3 10 z = 1
Solution Summary: The author calculates the solution set of the given system of equations, if it has one unique solution, and determines whether the system is inconsistent or dependent.
For Exercises 9-32, solve the system. If a system has one unique solution, write the solution set. Otherwise, determine the number of solutions to the system, and determine whether the system is inconsistent, or the equations are dependent. (See Examples 2-5)
x
+
7
2
y
+
1
2
z
=
4
3
4
x
+
y
+
1
2
z
=
−
1
1
10
x
−
2
5
y
−
3
10
z
=
1
Thomas' Calculus: Early Transcendentals (14th Edition)
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