If a lap is 440 yard how many laps would need to be completed to run a mile

Answers

Answer 1

Answer: 1760 yards = 1 mile

Therefore we divide 1760 / 440 = 4 laps to run to complete a mile.

Answer 2

Answer: 440 yards=1320 feet.
1 mile equals 5280 feet.
5280/1320=4 laps

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Find the pattern and use it to list the nth term in the sequence. 1, 1/32,1/243,1/1024,1/3125

Answers

$1;\ (1)/(32);\ (1)/(243);\ (1)/(1024);\ (1)/(3125)\n\n1=(1)/(1^5)\n\n(1)/(32)=(1)/(2^5)\n\n(1)/(243)=(1)/(3^5)\n\n(1)/(1024)=(1)/(4^5)\n\n(1)/(3125)=(1)/(5^5)\n\vdots\n\na_n=(1)/(n^5)\ where\ n\in\mathbb{N^+}$

What value or values of x satisfy 2|x+5.3|=4.2a. x can only equal –3.2.
b. x can only equal 7.4.
c. x can equal –3.2 or –7.4.
d. x can equal –3.2 or 7.4.

Answers

we have

$2\left|x+5.3\right|=4.2$

Step 1

Find the first solution (case positive)

$2(x+5.3)=4.2$

Eliminate the parenthesis left side

$2x+10.6=4.2$

Subtract $10.6$ both sides

$2x=4.2-10.6$

$2x=-6.4$

Divide by $2$ both sides

$x=-3.2$

Step 2

Find the second solution (case negative)

$2[-(x+5.3)]=4.2$

Eliminate the parenthesis left side

$-2x-10.6=4.2$

Adds $10.6$ both sides

$-2x=4.2+10.6$

$-2x=14.8$

Divide by $-2$ both sides

$x=-7.4$

therefore

the answer is the option C

x can equal –3.2 or –7.4

We have, /x+5.3/ = 2.1;
Then, x + 5.3 = 2.1 or x + 5.3 = -2.1;
x = 2.1 - 5.3; x = -3.2;
x = -2.1-5.3; x = -7.4;
The correct answer is c.

If you teach me how to mark brainlest i will mark you brainlest and you will get 20 points.

Answers

Answer:

tab on it.

Step-by-step explanation:

Each of the 20 members of a club needs to purchase a t-shirt and a flag. T-shirts cost $10 each. Flags cost $2.50 each. Before tax, what is the cost for all the t-shirts and flags?

Answers

Answer: $250.00

Step-by-step explanation:

1 Member needs one t-shirt and on flag.

$10.00+$2.50=$12.50 per member.

$12.50x20 members=$250.00

How to solve this problem

Answers

Well given the fact that the available answers aren't completely solved out, I would say you only need to get rid of the power. Distribute it out to the 4 coefficient and the degrees. You should end up with answer B.

Select all of the terms that are "like."a. xy 2
b. 2xy
c. x 2
d. -xy
e. 2x 2y
f. xy

Answers

Final answer:

The terms that are 'like' are: 2xy, -xy, and xy.

Explanation:

In mathematics, like terms are expressions that have the same variables raised to the same powers. When adding or subtracting like terms, you can combine them by adding or subtracting their coefficients while keeping the variables and exponents unchanged. This simplifies algebraic expressions and equations, making them easier to work with. For example, in the expression "3x + 2y - 5x + 7y," "3x" and "-5x" are like terms because they both have the variable "x" raised to the first power, so they can be combined to simplify the expression as "(-2x) + 2y + 7y."

The terms that are 'like' are: b. 2xy, d. -xy, and f. xy. To be 'like' terms, they must have the same variables raised to the same powers. In this case, all three terms have the variables x and y raised to the power of 1. The coefficients (the numbers multiplied by the variables) can be different. For example, 2xy, -xy, and xy are all 'like' terms because they have the same variables raised to the power of 1.

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Final answer:

In mathematics, like terms are terms that have the same variables and powers. In this case, the like terms are '2xy', '-xy', and 'xy' as they have the same variable part 'xy'.

Explanation:

In mathematics, like terms are terms whose variables have the same powers. The coefficients of these terms do not matter. Coefficients are the number part of the terms, while the variable part are the letters.

Looking at the options:

a. xy^2
b. 2xy
c. x^2
d. -xy
e. 2x^2y
f. xy

In these options, b. 2xy, d. -xy, and f. xy are like terms; they all have the same variable part 'xy'. The coefficients are different, but this does not affect their classification as like terms.

Learn more about Like Terms here:

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