The equation is (3/4)*s = 1464. By solving for 's', we find that there are 1952 students in total at the school.
In the problem, it's given that 3/4 (or 75%) of the total number of students in the school voted in an election, and that number amounts to 1464 voted ballots. We can write this as a proportion of fractions to determine the total number of students (s). The equation is (3/4)*s = 1464.
To solve for the total number of students in the school, or s, you would divide 1464 by (3/4). This results in s being equal to 1952 students. This means that there are 1952 students in total at the school.
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Answer:
the expression is equivalent to x^2/3
Step-by-step explanation:
[x^4/3 x^2/3]^1/3
=[x^4/3+(2/3)]^1/3
by using laws of exponent
a^m a^n=a^m+n
=[x^4/3+2/3]^1/3
=[x^6/3]^1/3
={x^2]^1/3
by using law of exponent
(a^m)^n=a^mn
=x^2×1/3
=x^2/3
i hope this will help you :)
Answer:
x^2/3
option B is the right option
solution,
hope this helps...
Good luck on your assignment...
The cost of 13 cans of soup, given that 4 cans cost $6.00, can be determined using a proportion. The proportion is set up as 4 cans / $6.00 = 13 cans / x, which Solving for x indicates that the cost for 13 cans of soup is $19.50.
The question is asking for the cost of 13 cans of soup, given that 4 cans cost $6.00. This can be solved using a proportion. A proportion is set up as an equivalent fraction equation, where the ratio of the number of cans to the cost is equal in both situations. Here, the proportion is 4 cans / $6.00 = 13 cans / x, where x is the cost we are trying to find for 13 cans of soup.
To solve for x, we would use cross-multiply. This gives us 4x = 78, where we then divide both sides by 4 to get x = $19.50. So, the cost of 13 cans of soup is $19.50.
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Multiply. A= ?/8