I need help on this problem please and thank you
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Dominic works on the weekends and on vacations from school mowing lawns in his neighborhood. For every one lawn he mows, he charges $6. Complete the table. Then write the ordered pairs and create a labeled graph. 1. Write the ratio of lawns mowed to the money he charges. ___________________2. Below, fill in the ratio table for up to five (5) lawns3. Graph the ordered pair, create a number scale for the X and Y axis, label the X and Y4. axis with a title, connect the points with a line, label the line with the equation. Please explain your answer for every question, 1-4 and put the answers in order.PLS HELP ME
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Answer:
B
Step-by-step explanation:
sorry!
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Answer:no its 69. :)
Step-by-step explanation:
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6: 6,12,18,24
8:8,16,24,32
So you can see that the multiple 24 is common between them. Now just add the two together and you have your answer: 48$
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So 15% of $1495 is $224.25
Then subtract $224.25 from $1495
$1495-$224.25=$1270.75
So the price exclusive of VAT is $1270.75
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I'd say there are two possibilities: the trivial choice of p=1 and starting number 4 (so you're summing one consecutive integer starting from 4), or you choose p = 8 and start from -3, so that all numbers from -3 to 3 simplify and you're left with 4 alone:
Final answer:
The problem does not provide enough information to find a unique value of 'p', the number of consecutive integers that sum up to 4. If we started the series at 1, for instance, 'p' would equal 4 (from 1+2+3+4=10), but if we were only considering positive integers and started the series at 2, 'p' would be 3, and so forth. Therefore, more information would be needed to solve this problem.
Explanation:
The subject of this question is in the domain of mathematics, specifically working with sums of consecutive integers. Based on the information given in the question, we are looking for the number of consecutive integers (or 'p') that add up to 4.
The formula used for the sum of consecutive integers is (n/2) (first number + last number), where n is the number of integers (in this case, 'p').
However, the question doesn't provide enough information to specify unique values for ‘p’. Any single set of consecutive integers that includes 4 (like 1,2,3,4 or -1,0,1,2,3,4,5,6,7,8,9) or the sum of 4 and 0 would satisfy the given condition, so 'p' could have multiple answers depending on the starting point of the series of integers.
Learn more about Consecutive integers here:
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