Which is bigger: 17.5% or 1/6

Answers

Answer 1

Answer:

In order to find this out, let's convert both of them into percents. Since 17.5 is already a percent, we only have to convert 1/6 into a percent. To convert 1/6 into a percent, you have to divide the numerator by the denominator. If you do that, you will get 0.1666..... as a repeating decimal. Now, multiply the decimal by 100 or just move the decimal 2 spaces to the right to get the percent. If you do that, you will get 16.6%. Since it is a repeating decimal, you can round it to 16.7%. So, 17.5% is larger than 1/6.

Hope it helps :)

Answer 2

Answer: Well if you plug 1/6 into the calculator it gives you the value of 0.166666667.
Then to make it a percentage you multiply it by 100
16.7% to 1 decimal place like the question

17.5% > 16.7%
Hence, 17.5% is bigger than 1/6

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Find the new amount

42 customers increased by 50%

Answers

$1 \% = (1)/(100) \n \n50 \% = 50 \cdot (1)/(100)=(50)/(100)=(1)/(2) \n \n 42 + 42 \cdot 50 \% = 42 + \not4\not2^(21) \cdot (1)/(\not2^1)=42+21 = 63 \n \n Answer : \ new \ amount \ : 63$

You would divide 42 by 2 to find what 50% of the total would be the add that number to 42 to get the answer.

For the graph shown, select the statement that best represents the given system of equations. 3y – x = 2 9y – 3x = 6Help Please Thank You

Answers

You can find that out by first putting two equations in slope-intercept form y=mx+b by solving for y.
3y - x = 2
3y = x+2
y = (1/3)x + 2/3

9y = 3x + 6
y = (3/9)x + 6/9
y = (1/3)x + 2/3

They are the same line as you can see in the final step.
Since the two lines are the same line, (they "coincide") they are coincident.
Coincident means there are an infinite number of solutions, and since they are the same line, there are an infinite number of solutions.

How can you use algebraic expressions to solve problems?

Answers

Final answer:

Algebraic expressions can be used to solve problems in mathematics by representing unknown quantities with variables, setting up equations based on given information, and using algebraic manipulation to find the values of the variables.

Explanation:

Algebraic expressions can be used to solve problems in mathematics by representing unknown quantities with variables, setting up equations based on given information, and using algebraic manipulation to find the values of the variables. Here is a step-by-step process to solve problems using algebraic expressions:

Read the problem carefully and identify the quantities involved.
Choose variables to represent the unknown quantities.
Write down the information given in the problem as equations using the variables.
Simplify and manipulate the equations using algebraic operations, such as addition, subtraction, multiplication, and division.
Solve the equations to find the values of the variables.
Check your solution by substituting the values back into the original equations.

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Final answer:

Algebraic expressions can be used to solve problems by representing unknown quantities with variables and using equations to find their values. It is important to read the problem carefully, identify the unknowns, and set up equations to solve for the variables.

Explanation:

Algebraic expressions can be used to solve problems in mathematics by representing unknown quantities with variables and using equations to find the values of those variables. When faced with a problem, you can set up an algebraic equation using the given information and solve for the unknown variable. For example, if you are asked to find the value of a number when it is multiplied by 5 and added to 10, you can write the equation as 5x + 10 = unknown value, where x represents the unknown number. By solving this equation, you can determine the value of the unknown number.

When using algebraic expressions to solve problems, it is important to carefully read and understand the problem, identify the unknowns, and define variables to represent them. Once the unknowns are identified, you can use the given information to set up equations and solve for the variables. It is also important to check the solution to ensure that it makes sense in the context of the problem.

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Basketball shoes are on sale for 22% off. What is the regular price if the sale price is $42 ??

Answers

so 22% off means that the shoes cost 100-22=78%

the shoes cost $42 so
42=78%

we want to find how much is 100% so we multiply 42/78 by 100/x where x is the cost since the same fraction inverted and multiplied by itself is = to 1. (if you don't get this feel free to message me)

so 4200/78x
we divide this on a calculator and get $53.85

By multiplying the discounted price by the percent which is 22% or .22, and then adding it to the discounted price the regular price will be known.
42*.22=9.24+42= Regular price
The regular price is $51.24

Plz help me fast. Use 27 for the volume of the cube plz explain..... Thx

Answers

27 is the cube of 3 .. 3x3x3 is 27. if that is what you were asking for..
a cube is a 3d square (literally). this means that it has equal side lengths and volume is length x width x breadth (as i learnt it). if all sides are 3then iits gonna be 3x3x3 which is 27.

A wooden board 100 centimeters long is cut into two pieces. One piece is 16 centimeters longer than the other. What are the lengths of the two pieces

Answers

100=x+y
x is 16 more than y
x=16+y
sub 16+y for x
100=16+y+y
100=16+2y
minu s16
84=2y
divide both sides by 2
42=y

sub back
x=16+y
x=16+42
x=58

the legnths are 42 cm and 58 cm

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