Could someone help me solve this Absolute Equation? Please? I would really appreciate any help...
Question~~
Evaluate the given expressions
when a = 3, b = -3, c = 4, and d = -1
(a/c)|c| + b – d
Why could you not follow the same steps I showed you for the other questions in that same sequence,
when you posted this before ?
http://www.jiskha.com/display.cgi?id=1443837328
show me your steps.
I tried to but I couldn't figure out how... This is what I did figure out~
(a/c)|c|+b-d
(3/4)|4|+(-3)-(-1)
(3/4)=0.75
0.75|4|+(-3)-(-1)
That's the only step I could figure out and I didn't want to ask you for more help because you already helped me so much and I figured I would bother you by asking for more help
figured*
Of course, I can help you solve this absolute equation! Let's break it down step-by-step.
Given the values, a = 3, b = -3, c = 4, and d = -1, we need to evaluate the expression (a/c)|c| + b - d.
Step 1: Evaluate |c|
The absolute value of a number is defined as its distance from zero on the number line, regardless of its sign. Since c = 4, the absolute value of c, denoted as |c|, will also be 4.
Step 2: Substitute the values
Now substitute the given values into the expression:
(a/c)|c| + b - d
= (3/4) * 4 + (-3) - (-1)
Step 3: Simplify
Next, simplify the expression:
= 3 + (-3) + 1
Step 4: Combine like terms
Combine the like terms:
= 1
Therefore, when a = 3, b = -3, c = 4, and d = -1, the value of the expression (a/c)|c| + b - d is 1.
Remember, when solving absolute equations, we first evaluate the absolute value of the number, and then substitute the values and simplify the expression.