which equation matches the table? the table shows a: 4 8 12 and 16
b:8 12 16 and 20
The equation that matches the table is b = a + 4.
Yuki works at a garden store. she is stacking 40-pound bags of soil. write the equation that gives the total weight, w, of the soil in pounds when yuki stacks b bags.
The equation that gives the total weight, w, of the soil in pounds when Yuki stacks b bags is:
w = 40b
what is the total weight, w, of 5 bags of soil?
To find the total weight of 5 bags of soil, we can substitute b = 5 into the equation w = 40b:
w = 40 * 5
w = 200 pounds
Therefore, the total weight, w, of 5 bags of soil is 200 pounds.
a company uses a medium sized box to ship different
equipment. the table shows the weight of the equipment and the total weight of the package. the table shows: Weight of equipment (oz), w: 3 6 12
total Weight of equipment (oz), p: 6 9 15. which statement is true?
By looking at the table, we can observe that the total weight of the package (p) is always double the weight of the equipment (w).
So the statement "The total weight of the package (p) is twice the weight of the equipment (w)" is true.
how much is w and p then?
Based on the given table:
Weight of equipment (w): 3, 6, 12 (in ounces)
Total weight of equipment (p): 6, 9, 15 (in ounces)
The weight of the equipment (w) refers to the weight of the individual equipment being shipped, while the total weight of the equipment (p) refers to the combined weight of the equipment and the packaging.
To summarize:
For the first row of the table:
w = 3 ounces
p = 6 ounces
For the second row of the table:
w = 6 ounces
p = 9 ounces
For the third row of the table:
w = 12 ounces
p = 15 ounces
solve for w
To solve for w, you can use the equation w = p/2, since we established that the total weight of the package (p) is always double the weight of the equipment (w).
Let's find the values of w for each row of the table:
For the first row of the table:
p = 6 ounces
w = p/2 = 6/2 = 3 ounces
For the second row of the table:
p = 9 ounces
w = p/2 = 9/2 = 4.5 ounces
For the third row of the table:
p = 15 ounces
w = p/2 = 15/2 = 7.5 ounces
So the values of w for each row of the table are:
w = 3 ounces
w = 4.5 ounces
w = 7.5 ounces
no no no there is only one correct answer cmon your taking so much of my F'ing time
Apologies for the confusion. Based on the table, the values of w for each row are:
For the first row of the table:
w = 3 ounces
For the second row of the table:
w = 6 ounces
For the third row of the table:
w = 12 ounces
Again, I apologize for any inconvenience caused.
IM NOT ASKING FOR THE QUESTION BACK IM ASKING FOR THE ANSWER SOLVE FOR w
I apologize for the misunderstanding. To solve for w, we need to look at the relationship between w and p in the table.
From the given values in the table, we can observe that the value of p is always 2 times the value of w.
Therefore, we can solve for w by dividing the value of p by 2.
For the first row:
p = 6 ounces
w = p/2 = 6/2 = 3 ounces
For the second row:
p = 9 ounces
w = p/2 = 9/2 = 4.5 ounces
For the third row:
p = 15 ounces
w = p/2 = 15/2 = 7.5 ounces
So the values of w for each row of the table are:
w = 3 ounces
w = 4.5 ounces
w = 7.5 ounces
Apologies for any confusion or frustration caused earlier.
a company uses a medium sized box to ship different
equipment. the table shows the weight of the equipment and the total weight of the package. the table shows: Weight of equipment (oz), w: 3 6 12
total Weight of equipment (oz), p: 6 9 15. which statement is true? the equation p = 3w models the relationship, to find any value of p, subtract 3 from the corresponding value of w, if the weight of the equipment is 15 oz, then the total weight of the package is 30 oz, if the weight of the equipment is 20 oz, then the total weight of the package is 23 oz.
Based on the given information, the statement "the equation p = 3w models the relationship" is true. This means that the total weight of the package (p) is equal to three times the weight of the equipment (w).
Let's test the other statements:
1. If the weight of the equipment is 15 oz, then the total weight of the package is 30 oz.
Using the equation p = 3w, we substitute w = 15:
p = 3(15) = 45
Therefore, the statement is not true. The total weight of the package would be 45 oz according to the equation, rather than 30 oz.
2. If the weight of the equipment is 20 oz, then the total weight of the package is 23 oz.
Using the equation p = 3w, we substitute w = 20:
p = 3(20) = 60
Again, the statement is not true. The total weight of the package would be 60 oz according to the equation, rather than 23 oz.
Therefore, out of the three statements, only the initial statement relating p and w is true.