How to find the slope of a line if it says 2x+Y=15 what do i do??

Answers

Answer 1

Answer: First, you have to convert it to slope intercept form, which is $y=mx+b$ )

$2x+y-2x=15-2x$
$y=-2x+15$

Knowing this, you can easily find the slope. In slope intercept form, the "m" or the coefficient of "x," is the slope.

$m=-2$

Therefore, your slope is -2.

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Leons older brother is 4 3/4 feet tall. Leon is 1/3 foot shorter than his brother. How tall is leon?

Answers

the answer would be 4 5/12

Answer:

1.583 feet

Step-by-step explanation:

4 3/4 is 4.75

4.75/3=1.583

What can be said about the discriminant of the graph below?

Answers

Answer:

C. The discriminant is negative, so there are no solutions.

Step-by-step explanation:

We see that the given figure is a graph of a parabola.

The equation of the given parabola is $y=(x-3)^(2)+1$ .

Simplifying the equation in quadratic form, we get,

The equation is $y=(x-3)^(2)+1$ i.e. $y=x^(2)+9-6x+1$ i.e. $y=x^(2)-6x+10$ .

We know that the discriminant of a quadratic equation $ax^(2)+bx+c=0$ is given by $D=b^(2)-4ac$

So, from the equation $x^(2)-6x+10=0$ , we have,

a = 1, b = -6 and c = 10

Thus, the discriminant is $D=(-6)^(2)-4* 1* 10$

i.e. $D=36-40$

i.e. $D=-4$

So, the discriminant is -4 i.e. negative.

Hence, as the discriminant is negative, there are no solutions.

What value represents the vertical translation from the graph of the parent function f(x) = x2 to the graph of the functiong(x) = (x + 5)2 + 3?

Answers

For this case we have that the parent function is given by:

We apply the following function transformations:

Horizontal translations:

Suppose that h> 0

To graph y = f (x + h), move the graph of h units to the left:

For h = 5 we have:

Vertical translations:

Suppose that k> 0

To graph y = f (x) + k, move the graph of k units up.

For k = 3 we have:

Answer:

The value represents the vertical translation from the graph of the parent function is:

Answer:

3 is the right answer on ENG 2022

Step-by-step explanation:

diagram 7(i) shows a square with area of 64cm² formed using a string.The string is cut to form another two congruent rectangles with length 5 cm, as shown in diagram 7(ii).Calculate the area , one of the rectangles.If u guys can help me solve this, u guys really save my life.I need to submit tomorrow morning.

Answers

Answer:

The area of one rectangle is 15 cm²

Step-by-step explanation:

The given parameters are;

The area of the square = 64 cm²

The length of the rectangles = 5 cm

The formula for the area of a square = (Side length)² = S²

Therefore, whereby the side length of the given square = S, we have;

Area of the square = 64 = S × S = S²

S = √(64 cm²) = 8 cm

The side length of the square = 8 cm

The perimeter of a square = The length of the string = Side length × 4 = 8 cm × 4 = 32 cm

∴ The perimeter of a square = The length of the string = 32 cm

The length of the string = The perimeter of the two congruent rectangle = 32 cm

Therefore;

The perimeter of each rectangle = 32/2 cm = 16 cm

Given that the length, L of the side of each rectangle is L = 5 cm, we have;

The perimeter of a rectangle = 2 × L + 2 × W

Where;

W = The width

The perimeter of the rectangle = 16 = 2 × 5 + 2 × W

2 × W = 16 - 2 × 5 = 6

W = 6/2 = 3

W = 3 cm

The width, W, of each rectangle is W = 3 cm

The area of one rectangle = W × L = 3 cm × 5 cm = 15 cm²

The area of one rectangle = 15 cm².

What is the value of the expression?Drag and drop the answer into the box to match the expression.
3.75+(−2.16)3.75+(−2.16)
−6.09−6.09−5.91−5.91−1.59−1.59−0.41−0.410.411.595.916.09

1 2 3 4 5

Answers

2 im not sure but i think is the correct ansew

3/7 + 2/7 as its simpliest form.

Answers

$(3)/(7)+(2)/(7)=(3+2)/(7)=(5)/(7)$

$(3)/(7)+(2)/(7)=(5)/(7)$

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