I'm not 100% but I got x=-3/2
To solve this problem, let's set up a system of equations. To do this, we can let one of the two unknown numbers be represented by the variable x and the other unknown number be represented by the variable y. We know that the difference between the two variables is 7 and the sum of the two variables is 59, which allows us to create the two equations below:
x - y = 7
x + y = 59
To solve this system of equations, we are going to use linear combination, which means simply adding the two left sides of the equations together and adding the two right sides of the equations together. Because the first equation has a -y term on the left side and the second equation has a +y term on the left side, these are going to cancel out, leaving us with:
2x = 66
To solve this equation, we must get the variable x alone on the left side of the equation by dividing both sides of the equation by 33, giving us:
x = 33
To solve for the other number, we must plug this known value for x into one of our original equations, as follows:
x + y = 59
33 + y = 59
To solve for the variable y, we must subtract 33 from both sides of the equation to get the variable y alone. This operation gives us:
y = 26
Therefore, the two numbers are 33 and 26.
Hope this helps!
Answer:
total distance = 3300 ft
Step-by-step explanation:
we know here displacement S is in vector form that is
......................1
and
and
magnitude is
so here distance from home to cafe is
S = 5 × 660
total distance = 3300 ft
Scholar #2 is correct. You take 15=-3m-18+5m-7 and combie like terms. Which will leave you with 15=2m-25. You will simplify from there, getting 20=m.
Apply division by 10 when one tenth of a number is required and apply multiplication by 10 when 10 times of a number is required.
<u>Solution:</u>
Need to determine what operation is required to get one-tenth of a number and 10 times of a number
To get one tenth of a number, divide the number by 10.
For example to get one – tenth of 100, divide it by 10, we get 10 as a result.
To get ten times of a number, multiply the number by 10
For example 10 times of 10 = 10 x 10 = 100
Hence apply division by 10 when one tenth of a number is required and apply multiplication by 10 when 10 times of a number is required.