Rewrite the fractions with their LCD.

(1)/(3x-9y),(6)/(5x-15y)

A.
2/8x-21y and 2/8x-21y

B.
5(x-3y)/15(x-3y) and 18(x-3y)/15(x-3y)^2

C.
5/15(x-3y) and 18/15(x-3y)

D.
5/15x-135y and 18/15x-135y

Final answer:

True, a combination of the elimination and substitution methods can solve a three-variable system of equations.

Explanation:

The statement is True. We can use a combination of the elimination and substitution methods to solve a three-variable system of equations. In the elimination method, we aim to eliminate one variable by adding or subtracting the equations, allowing us to solve for the remaining variables. This method works well when the coefficients of one variable are opposites in two equations.

In the substitution method, we solve one equation for one variable and substitute this expression into the other equations. This allows us to solve for the remaining variables. This method is more straightforward when one equation can be easily solved for one variable.

To minimize the weight of the tank, the base length should be (4/3) times the height. The height should be (3/4)^(1/4) times the fourth root of (2V/π).

To find the dimensions that will make the tank weight as little as possible, we need to consider the volume and weight of the tank. Since the tank is square-based, the volume can be calculated by V = bh^2, where b is the length of one side of the base and h is the height.

The weight of the tank can be calculated by multiplying the volume by the density of the stainless steel. W = V * density. Since we want to minimize the weight, we want to minimize the volume.

To do this, we can differentiate the volume equation with respect to b and set it equal to zero. Solving for b, we find that b = (4/3) * h. Substituting this value into the volume equation gives: V = (4/3) * h^3.

To further minimize the volume, we can take the derivative of the volume equation with respect to h and set it equal to zero. Solving for h, we find that h = (3/4)^(1/4) * (2V/π)^(1/4).

Answer:

2 students failed in the final exam.

Step-by-step explanation:

The scores on a final exam were approximately normally distributed.

We know that,

[tex]Z=\dfrac{X-\mu}{\sigma}[/tex]

X = raw score = 60

μ = mean = 82

σ = standard deviation = 11

Putting the values,

[tex]Z=\dfrac{60-82}{11}=-2[/tex]

From Normal distribution table, we get

[tex]P(-2)=0.0227=2.27\%[/tex]

Hence, 2.27% of 85 students failed the final exam.

So the number of students who failed the exam is,

[tex]=85\times 0.0227=1.9295\approx 2[/tex]

The sum of the square roots of -2 and -18 is [tex]\( 4\sqrt{2}i \)[/tex], where i is the imaginary unit.

The sum of the square roots of -2 and -18 involves complex numbers because both -2 and -18 are negative.

The square root of a negative number is not a real number, but it can be expressed using imaginary units.

The square root of -2 can be represented as [tex]\( \sqrt{-2} = \sqrt{2}i \),[/tex] where i is the imaginary unit, defined as [tex]\( i = \sqrt{-1} \).[/tex]

Similarly, the square root of -18 can be written as [tex]\( \sqrt{-18} = \sqrt{18}i \).[/tex]

Now, to find the sum of these square roots:

[tex]\[ \sqrt{-2} + \sqrt{-18} = \sqrt{2}i + \sqrt{18}i \][/tex]

[tex]\[ = \sqrt{2}i + \sqrt{2 \times 9}i \][/tex]

[tex]\[ = \sqrt{2}i + 3\sqrt{2}i \]\\\\ = (\sqrt{2} + 3\sqrt{2})i \][/tex]

[tex]\[ = 4\sqrt{2}i \][/tex]

So, the sum of[tex]\( \sqrt{-2} \) and \( \sqrt{-18} \)[/tex] is [tex]\( 4\sqrt{2}i \).[/tex]

Answer:

Step-by-step explanation:

a=0

b=2

answer (0,2)

Answer:

I believe the answer is (C.2)

Step-by-step explanation:

The answer isn’t 1. I took the test and ‘B’ is incorrect

Final answer:

C: 2

To find the average rate of change of the function f(x) from x = 0 to x = 1, we compute (f(1) - f(0)) / (1 - 0), which results in (3 - 1) / 1 = 2. The average rate of change is therefore 2.

Explanation:

To calculate the average rate of change for the function f(x) = −x⁴ + 4x³ − 2x² + x + 1 from x = 0 to x = 1, we use the formula:

Average rate of change = ∆f/∆x = (f(x_2) - f(x_1)) / (x_2 - x_1)

First, we need to find the values of f(x) at x = 0 and x = 1:

Using these values, we calculate the average rate of change:

Average rate of change = (3 - 1) / (1 - 0) = 2 / 1 = 2

Therefore, the average rate of change of the function from x = 0 to x = 1 is 2.

The equation of direct variation for the point (9, -12) would be y = -1 1/3x. The constant of variation, 'k', is found by dividing 'y' by 'x'. Therefore, 'k' is -12/9, which simplifies to -1 1/3.

In a direct variation, the equation can be represented in the form y = kx, where 'k' is the constant of variation. Here, 'k' can be found by dividing 'y' by 'x'. So, in the given point (9, -12), 'k' would be -12/9, which simplifies to -4/3 or -1 1/3. Therefore, the equation of the direct variation that includes the point (9, -12) would be y = -1 1/3x. The provided options don't include this equation, so it might be a mistake in the question options. Remember, the correct equation should always have 'y' and 'x' directly vary, and 'k' have the same sign as the given 'y' value.

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Answer:

D. z+nm

Step-by-step explanation:

Equaivalent to mn+z: Just switch the letters around and you get z+nm

Answer:

 [tex]log_{b} b^{n}[/tex] = n.

Step-by-step explanation:

Given :  [tex]log_{b} b^{n}[/tex] , b is any positive number not equal to 1 and n is any number.

To find : Evaluate the expression  [tex]log_{b} b^{n}[/tex].

Formula used : [tex]log_{b} x^{y}[/tex]. = y ∙ [tex]log_{b}[/tex](x) and

[tex]log_{b}(b) = 1.

Solution : We have  [tex]log_{b} b^{n}[/tex].

By logarithm rule :  [tex]log_{b} x^{y}[/tex]. = y ∙ [tex]log_{b}[/tex](x).

Then  [tex]log_{b} b^{n}[/tex] = n∙ [tex]log_{b}[/tex](b).

By logarithm rule :  [tex]log_{b}(b) = 1.

Now, n∙ [tex]log_{b}[/tex](b) = n.

Therefore,  [tex]log_{b} b^{n}[/tex] = n.

Answer:  the correct option is

(b) 0.

Step-by-step explanation:  We are given to find the number of solutions for the following linear equation :

[tex]9x-16=9x-23~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~(i)[/tex]

To find the number of solutions of the given equation, we must try to solve the equation and find the value of x.

From equation (i), we have

[tex]9x-16=9x-23\\\\\Rightarrow 9x-9x=-23+16\\\\\Rightarrow 0=-7,[/tex]

which can never be possible.

Thus, the given equation has NO solution.

Option (b) is CORRECT.

Final answer:

To express the given multiplications as decimal numbers: 6 times 0.1 equals 0.6, 6 times 0.01 equals 0.06, and 1 times 0.001 equals 0.001. Moving the decimal point due to multiplication by powers of 10 is the underlying concept.

Explanation:

The student's question involves expressing multiplications involving decimals in decimal form. To convert each term:

When numbers are multiplied by powers of 10, the decimal point is shifted to the right for positive exponents and to the left for negative exponents. Scientific notation is often used for this purpose.

Here are examples demonstrating the use of scientific notation:

Negative exponents indicate the decimal point moves to the left, whereas positive exponents indicate it moves to the right. For instance, 2.4 x 10-2 is equivalent to 0.024 as the decimal has moved two places to the left.

Answer:

m=90-6 days or b

Step-by-step explanation:

i got a hundred on the quiz...

The third angle for the triangle is equal to 89°.

Geometry is, with arithmetic, one of the oldest branches of mathematics. It is concerned with properties of space such as the distance, shape, size, and relative position of figures. A mathematician who works in the field of geometry is called a geometer.

A triangle is a three-edged polygon with three vertices. It is a fundamental shape in geometry. Triangle ABC denotes a triangle with vertices A, B, and C.

Given that the two angles of a triangle measure 43 degrees and 48 degrees. the value of the third angle will be calculated as,

Third angle = 180 - 43 - 48

Third angle = 89°

The complete question is given below.

If two angles of a triangle measure 43 degrees and 48 degrees what is the third angle of the triangle?

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