Show that the equation is not an identity by finding a value of x for which both sides are defined but not equal. cos x - cos x sinx = cos3 x

the first dot is on 2 for number of sprays and 30 for time

so the expression would be number of sprays over time so 2 over 30

2/30 that would reduce to 1/15 meaning each spray happens every 15 minutes

In this exercise we have to interpret the reported graph of an increasing linear function, we find that:

Letter B

Recalling the concepts of an increasing linear function as:

With this explanation we have:

Expression would be number of sprays over time so 2 over 30, will be equal to:

[tex]30/2=15[/tex]

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Density , Speed and Mileage(Fuel Economy) are the three common measurements which can be expressed as a ratio of two units.

What are Fundamental Units?

A fundamental unit is a tool for measuring a base quantity. Any physical quantity that cannot be expressed in terms of another physical quantity is referred to as a basic quantity. They are

Three Common Measurements be Density , Speed and Mileage where

Density = [tex]\frac{kg}{m^{3} }[/tex]

Speed = [tex]\frac{m}{s}[/tex]

Mileage = [tex]\frac{km}{L}[/tex]

Hence , the three common measurements which can be expressed as a ratio of two units are Density , Speed and Mileage

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Answer:

d

Step-by-step explanation:

Final answer:

Union and intersection are two operations used in set theory to combine sets or find common elements.

Explanation:

Union and intersection are two operations used in set theory. In mathematics, a set is a collection of distinct objects. The union of two sets A and B, denoted by A ∪ B, is the set that contains all the elements that are in either A or B or in both. The intersection of two sets A and B, denoted by A ∩ B, is the set that contains all the elements that are common to both A and B.

For example, let's consider two sets: A = {1, 2, 3} and B = {2, 3, 4}. The union of A and B is {1, 2, 3, 4}, as it contains all the elements from both sets. The intersection of A and B is {2, 3}, as those are the elements that are common to both sets.

The quotient of x-3 divided into 4x^2+3x+2 is 4x+9.

To find the quotient of x-3 divided into 4x^2+3x+2, we need to perform polynomial long division.

After performing polynomial long division, the quotient is 4x+9.

Final answer:

To find the quotient of x-3 divided into 4x^2+3x+2, you can use long division. The quotient is 4+15 with a remainder of 47.

Explanation:

To find the quotient of x-3 divided into 4x2+3x+2, we can use long division.

Therefore, the quotient of x-3 divided into 4x2+3x+2 is 4+15 with a remainder of 47.

Answer:  The correct option is (B) 258.

Step-by-step explanation:  We are give to use the remainder theorem  to determine the remainder when

[tex]d^4+2d^2+5d-10[/tex] is divided by [tex]d+4.[/tex]

Remainder Theorem :  If p(x) is a polynomial in x and a is any real number, then the remainder when p(x) is divided by (x - a) is p(a).

For the given division, we have

[tex]p(d)=d^4+2d^2+5d-10\\\\d-a=d+4~~~~~\Rightarrow a=-4.[/tex]

Therefore, the remainder when p(d) is divided by (d + 4) is given by

[tex]p(-4)\\\\=(-4)^4+2\times (-4)^2+5\times(-4)-10\\\\=256+32-20-10\\\\=288-30\\\\=258.[/tex]

Thus, the required remainder is 258.

Option (B) is CORRECT.

An equation is formed when two equal expressions. The total investment that Billy made in stocks is $135,000.

An equation is formed when two equal expressions are equated together with the help of an equal sign '='.

Let the amount that is invested in stocks be represented by x, while the amount that is been invested in bonds is represented by y.

Given that Bily invested 4.5 times as much in stocks as he did in bonds. Therefore, the equation to represent the given situation can be written as,

x = 4.5y

Also, given that the total amount that Billy invested is $165,000. Therefore, the total invested amount can be written as,

$165,000 = x + y

Substitute the value of x in the equation,

$165,000 = 4.5y + y

$165,000 = 5.5y

y = $165,000 / 5.5

y = $30,000

Now substitute the value of y in the first equation to know Billy's investment in stocks.

x = 4.5y

x = 4.5($30,000)

x = $135,000

Hence, the total investment that Billy made in stocks is $135,000.

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To solve this problem, we make use of the formula for Confidence Interval:

Confidence Interval = X ± z * σ / sqrt (n)

where X is the mean value, z is the z score which is taken from the standard tables, σ is the standard deviation, and n is the number of samples

z = 1.645 (at 90% Confidence Level)

Substituting the values into the equation:

Confidence Interval = 94 ± 1.645 * 12 / sqrt (70)

Confidence Interval = 94 ± 2.36

Confidence Interval = 91.64, 96.36

Therefore at 90% confidence level, the blood pressure reading ranges from 91.64 mmHg to 96.36 mmHg.

The product of r.s is -3+9i.

r = 1+2i ; s = 3+3i
Product of r and s to be determine.

Any number with representation as a+bi is complex number.

Here,
r.s  = (1+2i)(3+3i)
    = 3+6i+3i+6i²
    = 3+ 9i + 6(-1)   (∵ i²=-1)
    = 3 - 6 +9i
    = -3 + 9i

Thus, the product of r.s is -3+9i.

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Answer:

3

Step-by-step explanation:

To solve for the total number of 12 – flag signals Sally can make, we need to make use of the formula:

total flags = d! / (a! b! c!)

Where,

d = is the number of flags to create a signal = 12

a = number of red flags = 5

b = number of green flags = 3

c = number of white flags = 4

We can observe from the equation that the individual number of flags is factored out (or divided from) that is because all the 5 red flags are similar, all the 3 flags are similar and all 4 flags are similar.

Going back into the equation, by substituting and calculating:

total flags = 12! / (5! 3! 4!)

total flags = 27,720

Therefore there are about 27,720 different 12-flags signals.

The correct answer among the given choices is the first one:

“A graph shows Time in hours on the x-axis and Aida’s Distance from Tent in miles on y-axis. The graph shows three straight lines. The first straight line joins ordered pairs 0, 0 and 2, 4. The second straight line joins ordered pairs 2, 4 and 8, 4. The third straight line joins ordered pairs 8, 4 and 9, 0.”

The given ordered pairs is in the format of (t, d) where t is time and distance is d. Time will always be on the x-axis since it is always an independent variable.

The first ordered pair should be (2, 4) since it took her 2 hours to trek to the hilltop. From the given choices, only the 1st and 3rd choice has this first ordered pairs so we are down to two choices.

Now the second ordered pair should be (8, 4) since she spent 6 hours at the top but no change in distance. And only the 1st choice has this value therefore it is the answer.

Final answer:

The factored equivalent of [tex]f(x) = (2x^2 +7x + 3)(x - 3)[/tex] is f(x) = (x + 3)(2x + 1)(x - 3), and its zeros are -3, -0.5, and 3.

Explanation:

The factored equivalent of the polynomial f(x) = (2x2 +7x + 3)(x - 3) and its zeros can be determined by factoring [tex]2x^2 + 7x + 3[/tex]. We notice that this quadratic can be factored into (2x + 1)(x + 3). Therefore, when we include the (x - 3) term, we get the fully factored form,

f(x) = (2x + 1)(x + 3)(x - 3). To find the zeros, we set each factor equal to zero:

2x + 1 = 0 gives a zero of -0.5;

x + 3 = 0 gives a zero of -3; and,

x - 3 = 0 gives a zero of 3. Thus, the correct answer is

f(x) = (x + 3)(2x + 1)(x - 3); -3, -0.5, 3.

Answer:                

The probability  that both marbles she chooses are blue is [tex]\frac{2}{15}[/tex]

Step-by-step explanation:

Given : A bag contains 10 marbles: 4 are green, 2 are red, and 4 are blue. Christine chooses a marble at random, and without putting it back, chooses another one at random.

To find : What is the probability that both marbles she chooses are blue?

Solution :

Total number of marbles = 10

Green marbles = 4

Red marbles = 2

Blue marbles = 4

Probability is favorable outcome upon total number of outcomes.

Probability of getting first marble is blue

[tex]\text{P(first blue marble)}=\frac{4}{10}=\frac{2}{5}[/tex].

Without replacement,

i.e. Blue marble left = 3

Total marble left = 9

Probability of getting second marble is blue

[tex]\text{P(second blue marble)}=\frac{3}{9}=\frac{1}{3}[/tex]

The probability that both marbles she chooses are blue is

[tex]\text{P(both blue marble)}=\frac{2}{5}\times\frac{1}{3}[/tex]

[tex]\text{P(both blue marble)}=\frac{2}{15}[/tex]

Therefore, The probability  that both marbles she chooses are blue is [tex]\frac{2}{15}[/tex]

7/8 / 2/7 =

7/8 * 7/2 = 49/16 = 3 1/16

 she can make 3 shirts

Answer:

Option 1 is correct.

Step-by-step explanation:

Given graph of f(x)=6 sin(2x + π) - 5

we have to tell in what direction the graph vertically and horizontally shifted.

As, f(x+1) is a change on the inside of function, giving a horizontal shift left by 1, and the subtraction by 3 in f(x+1)-3 is a change to the outside of function, giving a vertical shift down by 3.

Hence, the graph of f(x)=6sin(2x + π) - 5  

Here, change on the inside of function, giving a horizontal shift left by [tex]\frac{\pi}{2}[/tex], and subtraction by 5 in function is a change to the outside of function, giving a vertical shift down by 5.

Option 1 is correct.