2.5 more than the quotient of h and 3 is w
If you wrote it correctly:
h/3 + 2.5 = w
a worker's earnings e are a function of the number of hours n worked at a rate of $8.75 per hour.
Well, well, well, it seems we've got some mathematical antics going on! So, to express this as an equation, we have h/3 + 2.5 = w. The quotient is ready to perform its daring divide and rule act while adding 2.5 to the mix, resulting in our hero, "w." Now, go forth and conquer those math problems with a smile!
To express the given statement algebraically, we can use the following symbols:
- Let "h" represent the variable for a specific value.
- Let "w" represent the variable for the result.
The given statement can be written as an equation as follows:
(h / 3) + 2.5 = w
Therefore, the algebraic expression for "2.5 more than the quotient of h and 3 is w" is (h / 3) + 2.5 = w.
To find the value of w, we need to understand the given equation and solve for w.
The equation states that "2.5 more than the quotient of h and 3 is w."
Let's break down the equation step by step:
1. Start with the quotient of h and 3: h/3
- This means we divide h by 3.
2. Add 2.5 to the quotient: (h/3) + 2.5
3. The result of step 2 is equal to w: (h/3) + 2.5 = w
Now, if you have a specific value of h, you can substitute it into the equation to find w. For example, if h = 9:
w = (9/3) + 2.5
w = 3 + 2.5
w = 5.5
So, when h = 9, w would equal 5.5.