Choose the best estimate for the weight of a strawberry A 1 ounce B 8 ounces

Answers

Answer 1

Answer:

Answer:1 ounce

Step-by-step explanation:

Related Questions

1. x+y=-3 ? What is the answer
HELP I HAVE 5 MIN TO TURN THIS IN!!!!!!!!!!!!!!!!!!!!!!!!!!!!What are the simplified versions of the expressions shown below??WILL MARK BRAINLIEST!!!!!!!!!!!!(11, 15, and 18 don't count)
A negative number is _____ a positive number
For each of the following numbers, write 4 decimals that would round to this whole number when rounde to the nearest whole number. a)14 b)28 c)32 d)50 e)67 f)71 g)88 h)95
Classify the numbers as prime or composite

Simplify the expression

Answers

Answer:

The simplified form of given expression $\frac{15xy}{5x^{(1)/(2)}y^2}$ is $\frac{3x^{(1)/(2)}}{y}$

Step-by-step explanation:

Given: Expression $\frac{15xy}{5x^{(1)/(2)}y^2}$

We have to write the given expression in simplified form,

Consider the given expression $\frac{15xy}{5x^{(1)/(2)}y^2}$

Divide the numbers $(15)/(5)=3$

we get,

$=\frac{3xy}{y^2x^{(1)/(2)}}$

Apply exponent rule , $(x^a)/(x^b)\:=\:x^(a-b)$

$\frac{x}{x^{(1)/(2)}}=x^{1-(1)/(2)}=x^{(1)/(2)}$

we get,

$=\frac{3yx^{(1)/(2)}}{y^2}$

Cancel y term, we have,

$=\frac{3x^{(1)/(2)}}{y}$

Thus, The simplified form of given expression $\frac{15xy}{5x^{(1)/(2)}y^2}$ is $\frac{3x^{(1)/(2)}}{y}$

Answer:

$3x^{(1)/(2)}y^(-1)$

Step-by-step explanation:

The given expression is:

$\frac{15xy}{5x^{(1)/(2)}y^2}$

We have to simplify the above given expression.Thus,

Firstly, divide the constant terms, we get

$(15)/(5)=3$

Now, applying the exponent law, that is $(x^a)/(x^b)=x^(a-b)$ , we have

$\frac{xy}{x^{(1)/(2)}y^2}=x^{1-(1)/(2)}y^(1-2)=x^{(1)/(2)}y^(-1)$

Thus, the simplified form of the above given equation is:

$3x^{(1)/(2)}y^(-1)$

PLZ HELP ME !What is the decimal equivalent of 3 over 9.?

0 point 2 bar. 0 point 3 bar. 0 point 4 bar. 0 point 5 bar.

Answers

0 point 3 bar
__________

The answer is 0 point 3 bar.

3. 11x-7y=-14. X-2y=-4

Answers

11x -7y= -14 (1)
x -2y= -4 (2)

Multiply (2) by 11, we have:
11x -22y= -44 (3)

Take (1)-(3), we have:
(11x-11x)+ (-7y-(-22y))= -14-(-44)
⇒ -7y+22y= -14+44
⇒ 15y= 30
⇒ y= 30/15
⇒ y= 2

x= -4+ 2y= -4+ 2*2= 0

The final answer is x=0, y=2~

The two given equations are
11x - 7y = - 14
x - 2y = -4
Now let us take the second equation for finding the value of x first
x - 2y = -4
x = 2y - 4
Now we have to put the value of x in the first equation
11x - 7y = - 14
11(2y - 4) - 7y = -14
22y - 44 - 7y = -14
15y = 44 - 14
15y = 30
y = 30/15
= 2
Now let us put the value of y in the second equation
x - 2y = -4
x - 2(2) = -4
x - 4 = -4
x = -4 + 4
= 0
So the value of x is 0 and the value of y is 2.

Miranda is packing eggs in cartons. Each carton holds 12 eggs. She has already filled 3 cartons. How many more eggs does she need to fill at least 17 cartons?

Answers

carton = 12

12x17=204

miranda needs 204 more eggs to fill 17 egg cartons

she need 204 more . I hope it help.

How to simplify rational expressions?

Answers

Steps to simplify rational expressions. 4) If possible, look for other factors that are common to the numerator and denominator. In our example, we can use foil in reverse to factor an (x − 1) in the denominator and further cancel this binomial from both the numerator and the denominator.

Sam used 17 cans of paint to paint 6 walls. He used the same amount of paint on each wall. Which is the correct way to show how to find how many cans of paint he used for each wall.

Answers

Answer:

The number of cans of paint he used for each wall is $2(5)/(6)$ cans

Step-by-step explanation:

Here we are told that Sam used 17 cans of paint to paint 6 walls

The correct way to find out how many cans of paint he used to paint each wall is as follows

Number of walls 17 cans of paint can paint = 6 Walls, we therefore divide both side of the equation by 6 so that the number of walls painted will be 1 as follows

6 Walls = Number of walls 17 cans of paint can paint

6/6 Walls = Number of walls 17/6 cans of paint can paint

∴ 1 Walls = Number of walls 17/6 cans of paint can paint or

∴ 1 Wall = Number of walls $2(5)/(6)$ cans of paint can paint

Which gives;

Number of walls $2(5)/(6)$ cans of paint can paint = 1 Wall or

The number of cans of paint he used for each wall = $2(5)/(6)$ cans.

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