50 Points

The graph shows the relationship between time and distance as Pam rides her bike. During which time period was the rate of change the greatest?
A) 0 to 5 minutes
B) 5 to 15 minutes
C) 5 to 20 minutes
D) 20 to 35 minutes

You multiply fractions simply by multiplying numerators and denominators with each other:

[tex] -\dfrac{1}{4} \times \left(-\dfrac{6}{11}\right) = \dfrac{1 \times 6}{4 \times 11} = \dfrac{6}{44} = \dfrac{3}{22} [/tex]

Answer: The correct statements are 0.75 (x,y) = (0.75x, 0.75y) , LM is parallel to L'M' and "the vertices of the image are closer to the origin than those of the preimage".

Explanation:

It is given that the triangle ABC was dilated according to the rule DO,0.75 (x,y)

DO, 0.75(x,y) represents the rule of dilation. Where both x- and y-coordinates are multiplied by 0.75 the dilation is about the origin has a scale factor of 0.75. The  notation for this dilation would be,

[tex](x,y)\rightarrow (0.75x,0.75y)[/tex]

Therefore, the first statement is true.

Since both x- and y-coordinates are multiplied by 0.75, therefore the sides of image and preimage are parallel but the sides of image are 0.75th of the side of preimage.

Therefore, the second statement "LM is parallel to L'M'" is true but the third and fifth statement is false.

The scale factor is 0.75 which is less than 1, so the vertices of the image are closer to the origin than those of the pre-image.

Therefore, the forth statement "The vertices of the image are closer to the origin than those of the pre-image"  is true.

Answer: 124

Step-by-step explanation:

Answer:

A. The check may not have been cashed or deposited yet.

Step-by-step explanation:

Our bank statements contains all our transactions like the debits or withdrawals, credits or deposited amounts and checks deducted etc.

And all the transactions are ordered date wise.

So, if a check was skipped on a bank statement, that means the check has not been cashed yet.

Answer:

A for plato

Step-by-step explanation:

And Whats the question here?!?!

Answer: C

Step-by-step explanation:

(x - y)²

we want (8)², so need: x - y = 8

There are many options that satisfy x - y = 8  but of the options provided to you, 10 - 2 is the only one that works.

A) 2 - 6 = -4

B) 64 - 0 = 64

C) 10 - 2 = 8

D) 8 - 64 = -56

Answer:

B.Triangle ACD is congruent to triangle ABD

Step-by-step-explanation:

We are given that AC is congruent to segment AB

We have to prove that angle ABD is congruent to angle ACD

When triangle ACD is congruent to triangle ABD

Then ,Angle ACD is congruent to angle ABD

Angle ADC is congruent to angle ADB

Angle CAD is congruent to angle DAB

Segment CD congruent to segment BD

Because when two triangles are congruent then sides and length of a triangle congruent to its corresponding sides and angles of other triangle .

Therefore,Triangle ACD is congruent to triangle triangle ABD is used to prove that angle ABD is congruent to angle ACD.

Hence, option B is true.

37 and 38

consecutive integers have a difference of 1 between them

let n and n + 1 be the consecutive integers, then

n + n + 1 = 75 ( subtract 1 from both sides )

2n = 74 ( divide both sides by 2 )

n = [tex]\frac{74}{2}[/tex] = 37

the integers are 37 and 37 + 1 = 38

0.25 = [tex]\frac{1}{4}[/tex]

1.25 = 1 [tex]\frac{1}{4}[/tex] = [tex]\frac{5}{4}[/tex]

there are 5 quarters thus each person woud get one quarter

  11 = -3k - 22 - 8k

  11 = -11k - 22         added like terms (-3k and -8k)

+22         +22

33 = -11k

[tex]\frac{33}{-11} = \frac{-11k}{-11}[/tex]

 -3 = k

Answer: k = -3

ANSWER

The possible rational roots are [tex]\pm3[/tex]  and [tex]\pm\frac{1}{3}[/tex]

EXPLANATION

According to  the rational roots theorem, the possible rational roots of

[tex]9x^3+14x^2-x+18=0[/tex]

is given by all the possible factors of [tex]18[/tex] which are

[tex]\pm1,\pm2,\pm3,\pm6,\pm9,\pm18[/tex]

expressed over all the possible factors of the coefficient of the highest degree of the polynomial which is  [tex]9[/tex] which are

[tex]\pm1,\pm3,\pm9[/tex]

in their simplest form.

One of this possible ratios are [tex]\pm9[/tex] from the factors of 18, over [tex]\pm3[/tex] from the factors of 9.

This will give us

[tex]\frac{\pm9}{\pm3} =\pm3[/tex].

Another possible rational root is

[tex]\pm \frac{1}{3}[/tex].

Hence the correct options are

A and C.

Secrete: Check if the denominator is a factor of 9 and the numerator is also a factor of 18, then these are the correct answers.

The possible rational roots of the polynomial 9x^3+14x^2-x+18=0, according to the Rational Root Theorem, are ±3 and ±1/3. The other given options, ±1/18 and ±1/2, do not meet the criteria set by the theorem.

The question asks for the possible rational roots of the polynomial 9x^3+14x^2-x+18=0 according to the Rational Root Theorem. The Rational Root Theorem states that if a polynomial has a rational root p/q, where p and q are integers and q is not zero, then p is a factor of the constant term and q is a factor of the leading coefficient.

The constant term here is 18 and its factors are ±1, ±2, ±3, ±6, ±9, and ±18. The leading coefficient is 9 and its factors are ±1, ±3, and ±9. According to the theorem, we divide each factor of the constant term by each factor of the leading coefficient to determine the potential rational roots:

±1/1, ±1/3, ±1/9

±2/1, ±2/3, ±2/9

±3/1, ±3/3, ±3/9

±6/1, ±6/3, ±6/9

±9/1, ±9/3, ±9/9

±18/1, ±18/3, ±18/9

Out of the list, the values that match the options given in the question are ±3 and ±1/3. The other options, ±1/18 and ±1/2, are not rational roots because 1/18 is not a factor of 9 (leading coefficient), and 2 is not a factor of 18 (constant term) when considering the reduced form.

After translating the statement into an inequality and simplifying, we find that the solution to 'The sum of a number and twenty is greater than four times the number decreased by one' lies in the set of numbers that is less than 7.

The question asks us to solve an inequality. Let's take the given statement: 'The sum of a number and twenty is greater than four times the number decreased by one'. We can translate that into an inequality as follows: x + 20 > 4x - 1, where x stands for the unknown number.

Now, let's simplify the inequality: we subtract x from both sides to get 20 > 3x - 1, and then add 1 to both sides, yielding 21 > 3x. Lastly, divide each side by 3 for the final inequality x < 7.

So the solution to the inequality means any number less than 7, when added to 20, is greater than four times the number minus one.

https://brainly.com/question/40505701

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Ok so logically it would be the blue which is consistently low and unlike the others doesn't get any spikes of interst so BLUE.

You seem to be missing some information here.

Complex conjugate example:

2 - 16i >> 2 + 16i

Are you sure this is the entire question?

For this case we have a complex number of the form:

[tex]a + (b) (i)\\[/tex]

Where:

Thus, given 1-8i, its complex conjugate is given by:

[tex]1 + 8i\\[/tex]

On the other hand, the product of both is given by:

[tex](1 + 8i) (1-8i) =\\\\(1 ^ 2-8i + 8i-64 (i ^ 2)) =\\\\1-64 (-1) =\\\\1 + 64 = 65\\[/tex]

Answer:

Conjugate complex: [tex]1 + 8i\\[/tex]

Product: 65

A: Amount of hours (h) you spend landscaping

B: Earnings ($20)

C: h(20)= 20^h  

Answer: 10 & 16

Step-by-step explanation:

The answer for x is 9. Hope this helps. See work below.

i think the answer is 9 hope this helps

Always remember (y2-y1)/(x2-x1) for finding slope

So (-3)-4 / 1-1=

-7 / 0

So undefined

y = -x - 6

the equation of a line in ' slope- intercept form ' is

y = mx + c ( m is the slope and c the y-intercept )

y = - x is in this form with m = - 1 and c = 0

note that parallel lines have equal slopes thus

the partial equation is y = - x + c

To find c substitute ( - 8, 2 ) into the partial equation

2 = 8 + c ⇒ c = 2 - 8 = - 6

y = - x - 6 ← is the equation of the parallel line

The equation is r(x) = 10x - 0.025x² where x is measured in thousands of toys produced, and r(x) is measured in thousands of dollars.

For maximum r, r'(x) = 0

It becomes: r'(x) = [tex]10-0.025\times2x=0[/tex]

= [tex]10-0.5x=0[/tex]

[tex]x=\frac{10}{0.05}[/tex]

x= 200

Hence, r(200) = [tex]10\times200-0.025\times200^{2}[/tex]

Solving it we get,

r(200) = 1000

Hence, maximum revenue is $1000.

The correct answer would be A.  13/3 Divided by -5/6

The total answer would be negative 5 1/5

because you do 4x3+1=13 over the denominator that is already there so 13/3 then you do KCF a.k.a keep change and flip you keep 13/3 change the division sign into multiplication sign then you flip the -5/6 to -6/5 then multiply straight across and reduce this is the way my teacher taught me how to remember - to positive kind of things:

when a negative thing or bad thing happens to a good person is that good or bad in this case thats bad because if you think about it if a bad thing happend to someone you care about that would be bad. then that same idea goes for each pattern another example could be a good thing (+) happens to a good person (+) it is good (+)

(+) (+)=+

(-) (-)=+

(+) (-)= -

(-) (+)= -

Hope this helps. Have a good day! :)

When dividing a positive number by a negative number, the result is negative.

A better estimation would be -3.

Solution:

As the two numbers [tex]15 \frac{1}{3} {\text{and} -4\frac{2}{3}[/tex] are mixed fractions.

[tex]15 \frac{1}{3}= \frac{46}{3} \\\\ -4\frac{2}{3}= \frac{-14}{3}[/tex]

Now,  [tex]\frac{ \frac{46}{3}}{\frac{-14}{3}}[/tex] = - 3

Ankur's answer= 3

The mistake he has committed , while dividing two fractions , he must have forgot that one of the fraction which is in the denominator bears negative sign  before it.

So, [tex]\frac {+}{-}= -[/tex].

Ankur forgot to put negative sign before 3.

So, The correct option which describes ankur's error is : Ankur found that the quotient of a positive number and a negative number is positive.

Option 3 is right choice.

Given

In an acute angled triangle ABC .

sin 2(A+B-C) = 1

tan(B + C -A) =√3

To proof

As given in the question

In an acute angled triangle ABC .

first solving the equation

sin 2(A+B-C) = 1

[tex]2 ( A + B - C ) = sin^{-1} (1)[/tex]

As we know

1 = sin90°

put this in the above equation

we get

[tex]2 ( A + B - C ) = sin^{-1} (sin90^{\circ})[/tex]

2A + 2B - 2C = 90

A+B -C =45      ( first equation )

now solving the equation

we get

tan(B + C -A) =√3

[tex]B + C -A =tan^{-1} \sqrt{3}[/tex]

[tex]B + C -A =tan^{-1}(tan60^{\circ})[/tex]

B + C -A = 60   ( second equation )

As given  acute angled triangle ABC

thus

∠A + ∠ B +∠ C = 180°   ( Angle sum property of a triangle )

than  the third equation becomes

A + B + C = 180  ( third equation)

Now solve the equation

A+B -C =45

and  B + C -A = 60

Now  subtract  B + C -A = 60 from A+B -C =45

we get

(A+B -C) - (B + C -A) = 45-60

2A -2C = -15

Put this value in the  equation 2A + 2B - 2C = 90

-15 + 2B = 90

2B = 90 + 15

B = 52.5

now subtracted -A +B +C = 60 from A + B + C =180

A + B + C +A - B - C =180 - 60

2A = 120

A  = 60

Put the value of A , B  in the equation A + B + C =180

60 + 52.5 + C = 180

C = 180 - 112.5

C = 67.5

Thus  ΔABC is an acute angle triangle

therefore

∠A = 60°

∠B = 52.5°

∠C = 67.5°

Hence proved

It is 165 degrees celcius

See the attached picture for the solution:

Answer:

76=R

R=76

180-76-38=66

Step-by-step explanation: