MATHEMATICS HIGH SCHOOL

12 yd
8 yd
6 yd

What’s the area ?

Answers

Answer 1
Answer:

Answer:

576 i believe!

Step-by-step explanation:

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Half of a number decreased by 8 is -3
1+4=5,2+5=12,3+6=21,8+11=?
946 is 43% of what number?
Select the best answer 1012. Which of the following is an example of a proper fraction? A.7/6 B. 4/3 C.4/4 D.3/4

What is the equation of the line written in general form?a. -3x - y + 2 = 0
b. 3x - y - 2 = 0
c. 3x + y - 2 = 0

Answers

i think its b or c but my best guess would be b

Final answer:

The equation in general form of a line is Ax + By + C = 0. Option a, -3x - y + 2 = 0, is already in general form.

Explanation:

The equation of a line can be written in different forms, such as point-slope form or slope-intercept form. The general form of a line, also known as the standard form, is given by Ax + By + C = 0. To determine the equation in general form, we need to rearrange the given equation.

Option a: -3x - y + 2 = 0. This equation is already in general form.

Option b: 3x - y - 2 = 0. To convert this equation to general form, we add 2 to both sides: 3x - y = 2.

Option c: 3x + y - 2 = 0. To convert this equation to general form, we subtract 2 from both sides: 3x + y = 2.

Therefore, option a (-3x - y + 2 = 0) is already written in general form.

Learn more about General form of a line here:

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The formula for the volume of w sphere is v=4\3 r3 what is the formula solved for r?

Answers

V of w sphere = (4)/(3)\pi
Multiply by 3 on either sides to get rid of the fraction.
V * 3 = (4)/(3) *3 \pi r^3
3V = 4\pi
Now divide either sides by 4\pi to isolate r³
(3V)/(4 \pi ) = (4 \pi )/(4 \pi )
4\pi and 4\pi cancels out
(3V)/(4 \pi ) = r³
Take the cube root to isolate r.
\sqrt[3]{ (3V)/(4 \pi ) } = \sqrt[3]{r^3}
the cube root cancels the cube

\sqrt[3]{ (3V)/(4 \pi ) } = r

9.45 x 10^-5 In standard form

Answers

The answer is : 0.0000945
Hope this helped have a good day!

a square with an area of 25 in.^2 is plotted on a grid so that the bottom-left corner is at the origin. The side of the square are horizontal and vertical. A reflection over what line maps the square onto itself?

Answers

Answer:

Reflection about the vertical line x = 2.5 inches will map the square unto itself

Step-by-step explanation:

The given parameters are;

The area of the square = 25 in²

The orientation of the sides of the square are horizontal and vertical

Therefore, we have;

The area, A, of the square given by the following relation;

A = Side²

A = 25 in²

Therefore;

The area of the square = 25 = side²

The length of the sides of the square = √A = √25 = 5

The length of the sides of the square = 5 inches

The reflection of a figure that maps the figure unto itself is a reflection along the line of symmetry

One of the line of symmetry that divides the square into two similar halves is the vertical straight that passes half way through the horizontal side, which is the point 2.5 inches to the right on the x-axis with the coordinates (2.5, 0)

Therefore, reflection about the line x = 2.5 inches will map the square unto itself.

526.30 rounded off to nearest tenth

Answers

526.3
The zero after the 3 is not nessesary

Displacement vectors of 3m and 5m in the same direction combine to make a displacement vector that is.a. 2m.b. 0m. c. 8m. d. 15m

Answers

Displacement vectors is 2m

Displacement vectors:

Given that;

Same length direction of 3m and 5m

Given direction is same

Find:

Displacement vectors

Computation:

Displacement vectors = 5m - 3m

Displacement vectors = 2m

Find out more about 'Displacement vectors'

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