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) 2 x = 3 y − 6 z − 1 6 y = 12 z − 10 x + 9 3 z = 6 y − 3 x − 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) 2 x = 3 y − 6 z − 1 6 y = 12 z − 10 x + 9 3 z = 6 y − 3 x − 1
Solution Summary: The author explains how to calculate the solution of the system of equations.
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)
2
x
=
3
y
−
6
z
−
1
6
y
=
12
z
−
10
x
+
9
3
z
=
6
y
−
3
x
−
1
Use the properties of logarithms, given that In(2) = 0.6931 and In(3) = 1.0986, to approximate the logarithm. Use a calculator to confirm your approximations. (Round your answers to four decimal places.)
(a) In(0.75)
(b) In(24)
(c) In(18)
1
(d) In
≈
2
72
Find the indefinite integral. (Remember the constant of integration.)
√tan(8x)
tan(8x) sec²(8x) dx
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, calculus and related others by exploring similar questions and additional content below.