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3 years ago

Answer both questions to the picture below

Mathematics

2 answers:

pishuonlain [190]3 years ago

4 0

Answer:

1. Bill has 56.

2. Sally will have 64 coins. Bill has (2*56) 112 coins.

The ratio is 64 : 112.

3. This ratio is equivalent to the original ratio.

Step-by-step explanation:

Dafna1 [17]3 years ago

3 0

Answer:

1. Bill has 14 coins

2. 8:14

Step-by-step explanation:

break it down. And use a calculator if needed

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Round to the nearest whole number 31.75

Setler [38]

The answer would be 32. :)

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3 years ago

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Identify the x- and y- intercept of the function f(x)=2x^2+5x-3

ycow [4]

0 = 2x^2 + 5x -3
0 = (2x-1)*(x+3)
2x-1=0 and x+3=0
X= 1/2 and x = -3

Y= 2(0)^2 + 5(0) - 3
Y = -3

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4 years ago

What is the answer to (66*47)+(85*68)=t?<br>?

Sergeu [11.5K]

Answer:3102+5780=8882

Step-by-step explanation:

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3 years ago

If Tanisha has $1000 to invest at 7% per annum compounded semiannually, how long will it be before she has $1600? If the co

Sphinxa [80]

Answer:

Using continuous interest 6.83 years before she has $1600.

Using continuous compounding, 6.71 years.

Step-by-step explanation:

Compound interest:

The compound interest formula is given by:

$A(t) = P(1 + \frac{r}{n})^{nt}$

Where A(t) is the amount of money after t years, P is the principal(the initial sum of money), r is the interest rate(as a decimal value), n is the number of times that interest is compounded per unit year and t is the time in years for which the money is invested or borrowed.

Continuous compounding:

The amount of money earned after t years in continuous interest is given by:

$P(t) = P(0)e^{rt}$

In which P(0) is the initial investment and r is the interest rate, as a decimal.

If Tanisha has $1000 to invest at 7% per annum compounded semiannually, how long will it be before she has $1600?

We have to find t for which $A(t) = 1600$ when $P = 1000, r = 0.07, n = 2$

$A(t) = P(1 + \frac{r}{n})^{nt}$

$1600 = 1000(1 + \frac{0.07}{2})^{2t}$

$(1.035)^{2t} = \frac{1600}{1000}$

$(1.035)^{2t} = 1.6$

$\log{1.035)^{2t}} = \log{1.6}$

$2t\log{1.035} = \log{1.6}$

$t = \frac{\log{1.6}}{2\log{1.035}}$

$t = 6.83$

Using continuous interest 6.83 years before she has $1600

If the compounding is continuous, how long will it be?

We have that $P(0) = 1000, r = 0.07$

Then

$P(t) = P(0)e^{rt}$

$1600 = 1000e^{0.07t}$

$e^{0.07t} = 1.6$

$\ln{e^{0.07t}} = \ln{1.6}$

$0.07t = \ln{1.6}$

$t = \frac{\ln{1.6}}{0.07}$

$t = 6.71$

Using continuous compounding, 6.71 years.

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4 years ago

PLS HELP ME, I NEED TO ANSWER THIS IN 15 MINUTES!!!

malfutka [58]

Amy:
8 + 5 + 6 + 11 + 4 + 6 +8 = 48
48 divide by 7 = 6.85

chelsea:
7 + 9 + 5 + 3 + 10 + 5 + 8 = 47
47 divide by 7 = 6.71

amy runs more on average.

both mean !

4 0

4 years ago

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