Difference between revisions of "008A Sample Final A, Question 7"

Revision as of 11:30, 23 May 2015

Question: Solve $2\vert 3x-4\vert -7=7$

Foundations
1) How do we get to the first key step in solving any function involving absolute value equations?
2) After this first key step how do we finish solving absolute value equations?
Answer:
1) We isolate the absolute value sign, so in this case we isolate $\vert 3x-4\vert$ .
2) We create two equations based on whether the expression inside the absolute value is positive or negative.
Then we solve both equations.

Solution:

Step 1:
Isolate the absolute values. First by adding 7 to both sides, then dividing both sides by 2.
This leads to $\vert 3x-4\vert =7.$

Step 2:
Now we create two equations: $3x-4=7$ and $3x-4=-7$ .

Step 3:
Now we solve both equations. The first leads to the solution $x={\frac {11}{3}}$ . The second leads to $x=-1$

Final Solution:
$x={\frac {11}{3}},-1$

@@ Line 6: / Line 6: @@
 |1) How do we get to the first key step in solving any function involving absolute value equations?
 |-
-|2) How do we solve absolute value equations?
+|2) After this first key step how do we finish solving absolute value equations?
 |-
 |Answer:
 |-
-|1) We isolate everything inside of the absolute value signs.
+|1) We isolate the absolute value sign, so in this case we isolate <math>\vert 3x - 4\vert</math>.
 |-
 |2) We create two equations based on whether the expression inside the absolute value is positive or negative.