martin-gay, beginning algebra, 5ed 22 33 using both properties divide both sides by 3. example: 3z...
TRANSCRIPT
![Page 1: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/1.jpg)
![Page 2: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/2.jpg)
Martin-Gay, Beginning Algebra, 5ed 22
![Page 3: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/3.jpg)
Martin-Gay, Beginning Algebra, 5ed 33
Using Both Properties
Divide both sides by 3.3
27
3
3z
Example:
3z – 1 = 26
3z = 27 Simplify both sides.
z = 9 Simplify both sides.
3z – 1 + 1 = 26 + 1 Add 1 to both sides.
![Page 4: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/4.jpg)
Martin-Gay, Beginning Algebra, 5ed 44
Using Both Properties
Example:
12x + 30 + 8x – 6 = 10
20x + 24 = 10 Simplify the left side.
20x = – 14 Simplify both sides.
20
14
20
20 x
Divide both sides by 20.
20x + 24 + (– 24) = 10 + (– 24) Add –24 to both sides.
7
10x Simplify both sides.
![Page 5: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/5.jpg)
Martin-Gay, Beginning Algebra, 5ed 55
Solving Linear Equations
301093 yy Simplify both sides.
21 7y Simplify both sides.
y 3 Divide both sides by 7.
Example: Solve the equation.3( 3) 2 6
5y y
Add –3y to both sides.30)3(109)3(3 yyyy
Add –30 to both sides.)30(307)30(9 y
Multiply both sides by 5. 3( 3)5 5 2 6
5
yy
Simplify both sides.9 7 30y
![Page 6: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/6.jpg)
Martin-Gay, Beginning Algebra, 5ed 66
– 0.01(5a + 4) = 0.04 – 0.01(a + 4)
Multiply both sides by 100.
Example: Solve the equation.
– 1(5a + 4) = 4 – 1(a + 4)
Apply the distributive property. – 5a – 4 = 4 – a – 4
Add a to both sides and simplify. – 4a – 4 = 0
Add 4 to both sides and simplify. – 4a = 4
Divide both sides by -4. a = – 1
– 5a – 4 = – a Simplify both sides
![Page 7: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/7.jpg)
Martin-Gay, Beginning Algebra, 5ed 77
– 0.01(5a + 4) = 0.04 – 0.01(a + 4)
Example: Solve the equation.
– 0.05a – 0.04 = 0.04 – 0.01a – 0.04 Apply the distributive property.
– 0.05a – 0.04 = – 0.01a
Add 0.01a to both sides. – 0.04a – 0.04 = 0
Add 0.04 to both sides and simplify. – 0.04a = 0.04
Divide both sides by -0.04. a = – 1
Simplify both sides.
![Page 8: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/8.jpg)
Martin-Gay, Beginning Algebra, 5ed 88
Identity Equations
5x – 5 = 2(x + 1) + 3x – 7
5x – 5 = 2x + 2 + 3x – 7 Use distributive property.
5x – 5 = 5x – 5 Simplify the right side.
Both sides of the equation are identical. This equation will be true for every x that is substituted into the equation, the solution is “all real numbers.”
Example: Solve the equation.
0 = 0 Add 5 to both sides.
– 5 = – 5 Add -5x to both sides.
Identity Equation.
![Page 9: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/9.jpg)
Martin-Gay, Beginning Algebra, 5ed 99
Contradiction Equations
Since no value for the variable x can be substituted into this equation that will make this a true statement, there is “no solution.”
3x – 7 = 3(x + 1)
3x – 7 = 3x + 3 Use distributive property.
– 7 = 3 Simplify both sides.
3x + (– 3x) – 7 = 3x + (– 3x) + 3 Add –3x to both sides.
Example: Solve the equation.
Contradiction Equation.
![Page 10: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/10.jpg)
Martin-Gay, Beginning Algebra, 5ed 1010
Solving Linear Equations
![Page 11: Martin-Gay, Beginning Algebra, 5ed 22 33 Using Both Properties Divide both sides by 3. Example: 3z – 1 = 26 3z = 27 Simplify both sides. z = 9 Simplify](https://reader036.vdocuments.us/reader036/viewer/2022083006/56649f315503460f94c4d1f7/html5/thumbnails/11.jpg)
Martin-Gay, Beginning Algebra, 5ed 1111
Examples
c)
a)
d)
b)