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3 years ago

11

When Sarah bakes cookies, she always burns 15% of them. How many cookies does Sara need to bake so that she finishes with 68 unb

urnt cookies ?

1 answer:

dmitriy555 [2]3 years ago

4 0

68 divided by 15 multiplied by 6.9 30.8266

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Which one is the steepest

irakobra [83]

I think it is Steep C because it is skinner and the more steeper it is the more time it will take you to climb it.

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3 years ago

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Solve 16(t - 1) + 10 > 8(t + 2) + 4(t - 1) + 4t.

Neporo4naja [7]

Answer:

The answer to your question is it has no solution

Step-by-step explanation:

Inequality

16(t - 1) + 10 > 8(t + 2) + 4(t - 1) + 4t

-Expand

16t - 16 + 10 > 8t + 16 + 4t - 4 + 4t

- Group like terms

16t - 8t - 4t - 4t > 16 - 4 + 16 - 10

-Simplify

0 > 18

- It has no solution because the variable is cancelled.

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4 years ago

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Help will mark brainliest answer

Naddika [18.5K]

Answer : 110 degree

To find angle 1 , we apply outside angle theorem Lets name each point Measurement of arc EF=280 degrees

Measurement of arc GH = 60

Angle D = angle 1

Please refer to the theorem attached below

$angle D = \frac{arc(EF)-arc(GH)}{2}$

Now we plug in the values

$angle 1 = \frac{280-60}{2}$

angle 1 = 110

Measurement of angle 1 = 110 degrees

5 0

3 years ago

The Better Baby Buggy Co. has just come out with a new model, the Turbo. The market research department predicts that the demand

dlinn [17]

Answer:

$68

Step-by-step explanation:

We have been given the demand equation for Turbos as $q=-4p+544$ , where q is the number of buggies the company can sell in a month if the price is $p per buggy.

Let us find revenue function by multiplying price of p units by demand function as:

Revenue function: $pq=p(-4p+544)$

$pq=-4p^2+544p$

Since revenue function is a downward opening parabola, so its maximum point will be vertex.

Let us find x-coordinate of vertex using formula $\frac{-b}{2a}$ .

$\frac{-b}{2a}=\frac{-544}{2\times -4}$

$\frac{-b}{2a}=\frac{-544}{-8}$

$\frac{-b}{2a}=68$

The maximum revenue would be the y-coordinate of vertex.

Let us substitute $x=68$ in revenue formula.

$pq=-4(68)^2+544(68)$

$pq=-4*4624+544(68)$

$pq=-18496+36992$

$pq=18496$

Therefore, the company should sell each buggy for $68 to get the maximum revenue of $18,496.

8 0

3 years ago

Given that a = -1, b=2 and c= -3 ,find the value of a(b2+c2)

KiRa [710]

Answer:

a( $b^{2}$ + $c^{2}$ ) = = -13

Step-by-step explanation:

Given that a = -1, b=2 and c= -3

find the value of a( $b^{2}$ + $c^{2}$ )

Just substitute the values given for each variable

a( $b^{2}$ + $c^{2}$ ) = (-1)( $2^{2}$ + $(-3)^{2}$ ) ; do the exponents first

a( $b^{2}$ + $c^{2}$ ) = (-1)(4+9)=(-1)(13) ; now add inside the parenthesis;

a( $b^{2}$ + $c^{2}$ ) = -13 ; and multiply by -1

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3 years ago