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1 year ago

More pointsssssssssssssssss

Mathematics

2 answers:

umka2103 [35]1 year ago

6 0

Answer:

thank u

Step-by-step explanation:

Julli [10]1 year ago

5 0

Answer:

teehee thank yu <333

Step-by-step explanation:

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What is 3,700,000 in scientific notation??

lawyer [7]

<h3>Answer: Choice D) 3.7 * 10^6</h3>

=========================================================

Explanation:

Place a decimal point between the first two digits 3 and 7.

Now ask yourself how you can go from 3.7 back to the original value. Notice we can move the decimal point 6 spots to the right to go from 3.7 back to 3,700,000

Therefore, the exponent over the 10 is 6. The exponent is positive to mean we move the decimal point to the right. If we had a negative exponent, then we'd move left.

You can use a calculator to confirm that 3.7 * 10^6 = 3,700,000

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Side notes:

3,700,000 = 3 million, 7 hundred thousand

3,700,000 = 3.7 million

7 0

2 years ago

32. Use Structure Write an inequality that<br> represents the graph.

Furkat [3]

Answer:

Step-by-step explanation:

5 0

8 months ago

"We might think that a ball that is dropped from a height of 15 feet and rebounds to a height 7/8 of its previous height at each

tatyana61 [14]

Answer:

Total Time = 4.51 s

Step-by-step explanation:

Solution:

- It firstly asks you to prove that that statement is true. To prove it, we will need a little bit of kinematics:

y = v_o*t + 0.5*a*t^2

Where, v_o : Initial velocity = 0 ... dropped

a: Acceleration due to gravity = 32 ft / s^2

y = h ( Initial height )

h = 0 + 0.5*32*t^2

t^2 = 2*h / 32

t = 0.25*√h ...... Proven

- We know that ball rebounds back to 7/8 of its previous height h. So we will calculate times for each bounce:

$1st : 0.25*\sqrt{15}\\\\2nd: 0.25*\sqrt{15} + 0.25*\sqrt{15*\frac{7}{8} } + 0.25*\sqrt{15*\frac{7}{8} } = 0.25*\sqrt{15} + 0.5*\sqrt{15*\frac{7}{8} }\\\\3rd: 0.25*\sqrt{15} + 0.5*\sqrt{15*\frac{7}{8} } + 2*0.25*\sqrt{15*(\frac{7}{8} })^2\\\\= 0.25*\sqrt{15} + 0.5*\sqrt{15*\frac{7}{8} } + 0.5*\sqrt{15*(\frac{7}{8} })^2\\\\4th: 0.25*\sqrt{15} + 0.5*\sqrt{15*\frac{7}{8} } + 0.5*\sqrt{15*(\frac{7}{8} })^2 + 2*0.25*\sqrt{15*(\frac{7}{8} })^3 \\\\$

$= 0.25*\sqrt{15} + 0.5*\sqrt{15*\frac{7}{8} } + 0.5*\sqrt{15*(\frac{7}{8} })^2 + 0.5*\sqrt{15*(\frac{7}{8} })^3$

- How long it has been bouncing at nth bounce, we will look at the pattern between 1st, 2nd and 3rd and 4th bounce times calculated above. We see it follows a geometric series with formula:

Total Time ( nth bounce ) = Sum to nth ( $\frac{1}{2}*\sqrt{15*(\frac{7}{8})^(^i^-^1^) } - \frac{1}{4}*\sqrt{15}$ )

- The formula for sum to infinity for geometric progression is:

S∞ = a / 1 - r

Where, a = 15 , r = ( 7 / 8 )

S∞ = 15 / 1 - (7/8) = 15 / (1/8)

S∞ = 120

- Then we have:

Total Time = 0.5*√S∞ - 0.25*√15

Total Time = 0.5*√120 - 0.25*√15

Total Time = 4.51 s

5 0

2 years ago

3) What is the measurement of each side if the perimeter is 78?<br> (3x - 4) cm<br> (2x + 3) cm

Goshia [24]

There are 4 sides so add 4 sides
3x-4+3x-4+2x+3+2x+3=78

Combine like terms
10x-2=78

Add 2 to each side of the equation
10x=80

Divide by 10
X=8

Enter x into equation
3(8)-4=20
2(8)+3=19

Multiply by 2
20 x 2= 40
19 x 2 = 38
40 +38 =78

Side 1- 20
Side 2- 19
Side 3- 20
Side 4- 19

3 0

2 years ago

Do the equations 5y−2x=18 and 6x=−4y−10 form a system of linear equations?

Oduvanchick [21]

Yes, The equations 5y−2x=18 and 6x = −4y−10 form a system of linear equations.

For clear understanding refer to the attachment please! :)

5 0

2 years ago