Answer:
There were 35 gallons of gasoline and 500 gallons of kerosene.
Step-by-step explanation:
<u>Step 1: Write data for equation 1</u>
<em>Let gallons of kerosene be x</em>
<em>Let gallons of gasoline be y</em>
<em>Total capacity of truck is 4000</em>
<u>Step 2: Form equation 1</u>
x + y = 4000
<u>Step 3: Write data for equation 2</u>
<em>Profit of total gallons of kerosene is 0.12x</em>
<em>Profit of total gallons of gasoline is 16y</em>
<em>Total profit is $620</em>
<u>Step 4: Form equation 2</u>
0.12x + 16y = 620
<u>Step 5: Find x in terms of y from equation 1</u>
x + y = 4000
x = 4000 - y
<u>Step 6: Substitute value of x in equation 2</u>
0.12x + 16y = 620
0.12 (4000 - y) + 16y = 620
480 - 12y + 16y = 620
4y = 620 - 480
y = 140/4
y = 35
<u>Step 7: Substitute value of y in equation 1 to find x</u>
0.12x + 16y = 620
0.12x + 16 ( 35 ) = 620
0.12x = 60
x = 500
There were 35 gallons of gasoline and 500 gallons of kerosene.
!!
We begin with an unknown initial investment value, which we will call P. This value is what we are solving for.
The amount in the account on January 1st, 2015 before Carol withdraws $1000 is found by the compound interest formula A = P(1+r/n)^(nt) ; where A is the amount in the account after interest, r is the interest rate, t is time (in years), and n is the number of compounding periods per year.
In this problem, the interest compounds annually, so we can simplify the formula to A = P(1+r)^t. We can plug in our values for r and t. r is equal to .025, because that is equal to 2.5%. t is equal to one, so we can just write A = P(1.025).
We then must withdraw 1000 from this amount, and allow it to gain interest for one more year.
The principle in the account at the beginning of 2015 after the withdrawal is equal to 1.025P - 1000. We can plug this into the compound interest formula again, as well as the amount in the account at the beginning of 2016.
23,517.6 = (1.025P - 1000)(1 + .025)^1
23,517.6 = (1.025P - 1000)(1.025)
Divide both sides by 1.025
22,944 = (1.025P - 1000)
Add 1000 to both sides
23,944 = 1.025P
Divide both by 1.025 for the answer
$22,384.39 = P. We now have the value of the initial investment.
Answer: 184
Step-by-step explanation:
The nth term of am arithmetic sequence is calculated as:
Nth term= a+(n-1)d
where a = first term
d = common difference
a = -10
d = -8 -(-10) = -8+10 = 2
98th term= a+(n-1)d
= -10 + (98-1)(2)
= -10 + (97×2)
= -10 + 194
= 184
The 98th term of the arithmetic sequence is 184
First off, let's convert the decimal to a fraction, notice, we have two decimals, so we'll use in the denominator, a 1 with two zeros then, two decimals, two zeros, thus

now, we know then the ratio dimensions for the new photograph,

Answer:
3 1/2 i think on a number line
Step-by-step explanation:
7/2 and put into an what it would be
7 2nds
2/2 + 2/2 + 2/2 with one left that is 3 and 1/2