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4 years ago

Two numbers that multiply to -30 and add to 3?

1 answer:

Nadusha1986 [10]4 years ago

5 0

X+y=3
xy=-30

x+y=3
minusx
y=3-x
sub
x(3-x)=-30
3x-x^2=-30
times -1 both sides
x^2-3x=30
minus 30 both sides
x^2-3x-30=0
use quadratic
for
ax^2+bx+c=0
x= $\frac{-b+/- \sqrt{b^2-4ac} }{2a}$

1x^2-3x-30=0
a=1
b=-3
c=-30

x= $\frac{-(-3)+/- \sqrt{(-3)^2-4(1)(-30)} }{2(1)}$
x= $\frac{3+/- \sqrt{9+120} }{2}$
x= $\frac{3+/- \sqrt{129} }{2}$
the numbers are $\frac{3+ \sqrt{129} }{2}$ and $\frac{3- \sqrt{129} }{2}$

You might be interested in

our goal is to run a mean of 45 minutes per day for a week. For the first six days, you run 38, 40, 40, 42, 43, and 50 minutes.

oksano4ka [1.4K]

Answer:

62 minutes.

Step-by-step explanation:

To find the mean, you need to add together all of your values (the minutes) and divide them by the number of values (how many sets of minutes given).

So, choosing to add 62 minutes:

38 + 40 + 40 + 42 + 43 + 50 + 62 = 315

There are 7 sets of minutes in total, so we then divide 315 by 7.

315/7 = 45 minutes

Therefore, running 62 minutes on the seventh day would cause you to run a mean of 45 minutes per day for the week.

6 0

3 years ago

Find the midpoint of the line segment with end coordinates of: ( 4 , − 2 ) and ( 2 , − 10

Olegator [25]

The given line segment's midpoint is (3,-6)

Step-by-step explanation:

Step 1 :

Let A be the point (4,-2) and B be the point (2,-10)

We need to obtain the midpoint of AB

Let M (x,y) be the Midpoint.

Step 2 :

The x co-ordinate of a line segment's midpoint obtained by adding the x co-ordinate of its end point and dividing by 2.

The y co-ordinate of a line segment's midpoint obtained by adding the y co-ordinate of its end point and dividing by 2.

So we have x = (4 + 2) ÷ 2 = 3

y = (-2 - 10) ÷ 2 = -6

Hence M = (3,-6)

Step 3 :

Answer :

The given line segment's midpoint is (3,-6)

3 0

4 years ago

9a + 20 = 7a+ 4 a = ? Help please!

shutvik [7]

Answer:

9a+20=7a-20

2a=4-20

a=2-10

A= -8

Step-by-step explanation:

3 0

3 years ago

Which classification best describes the following system of equations? X=5, y=6, -x-y+z=0

PolarNik [594]

I don't see any answer choices, but because it already gives you x and y, all you have to do is plug them into the equation.
-(5)-(6)+z=0
combine like terms
-11 + z = 0
add 11 to both sides
z = 11 is your answer

7 0

3 years ago

Read 2 more answers

Triangle ABC has vertices A(-3,0) B(0,6) C(4,6). Find the equations of the three medians of triangle ABC

Mariana [72]

Answer:

1. $y=-6x+6, y=\frac{6}{5} x+\frac{18}{5}, y=\frac{6}{11} x+\frac{42}{11}$

2. $y=-\frac{1}{2} x+2\frac{1}{4} , x=2, y=-\frac{7}{6}x+\frac{43}{12}$

Step-by-step explanation:

A(−3, 0), B(0, 6), and C(4, 6)

using the midpoint formula: $(\frac{x_1+x_2}{2}, \frac{y_1+y_2}{2})$ we can find all of their midpoint which is necessary to complete question 1 and 2

Mid AB=(-1.5, 3), Mid BC=(2, 6), Mid AC=(0.5,3)

Next, we have to find the slope of from the vertex and the midpoint of each side. We use the slope formula: $\frac{y_2-y_1}{x_2-x_1}$ .

You would get -6, 6/5, and 6/11.

Next you substitute in the coordinates for the equation of each for example: y=-6x, you switch in the set of cords AB which is (-1.5, 3). 3=-6(-1.5)+z and find that z=6, so the equation is y=-6x+6. As for the rest, repeat the same process until you find all 3 cords. You should get an answer of $y=-6x+6, y=\frac{6}{5} x+\frac{18}{5}, y=\frac{6}{11} x+\frac{42}{11}$

For question 2,

The line has to be perpendicular bisector to the midpoint, signifying that it has to split 2 angles into congruent angles and a side into half. In order to do that we need to first find the opposite reciprocal of each side's slope. Which means we need to once again use the slope formula and get the opposite reciprocal by $-\frac{1}{slope}$ . For all the opposite reciprocal slopes you get will be incorporated into the final formulas. That gives us the slopes of -1/2, 0 and -7/6. Then do the same process of matching cords with these incomplete equations and you can find the final equations of $y=-\frac{1}{2} x+2\frac{1}{4} , x=2, y=-\frac{7}{6}x+\frac{43}{12}$

I hope that helped with your question!! :)

Also I'm an RSM student too and I didn't know how to do them before so I searched it up.

6 0

3 years ago