Kenya exchanges $150 for British pounds(£). Suppose the conversion rate is £1 = $1.60. How many pounds should she receive?

Answers

Answer 1

Answer:

She will receive £93.75

- Kenya exchanges $150 for British pounds(£)

This mean Kenya have a cash of $150 and needs to convert it to the British pounds (£).

- Suppose the conversion rate is £1 = $1.60

This means that at the moment that Kenya want to convert $150 to the British pounds (£), the conversion rate of £1 = $1.60, equivalent to $1 = £0.625

- How many pounds should she receive?

Since £1 = $1.60, $1 = £0.625

Her $150 is equivalent to £93.75 (£0.625*150)

Therefore, she will receive £93.75

See related question herebrainly.com/question/3541173 brainly.com/question/4208444

Answer 2

Answer: If $1.60 is 1 pound, divide the $ amount by 1.60 to find the number of pounds. 150/1.6 = 93.75

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Given: 5 > x + 7. Choose the solution set.

{x | x R, x > -2}
{x | x R, x < -2}
{x | x R, x > 2}
{x | x R, x < 2}

Answers

$5\ \textgreater \ x+7$

Switch sides:

$x+7\ \textless \ 5$

Subtract 7 from both sides :

$x+7-7\ \textless \ 5-7$

$x\ \textless \ -2$

Answer B

{x | x R, x < -2}

hope this helps!

Find the coordinates of the other endpoint when you are given the midpoint (point M) and one of the endpoints (point P). P = (3, 5) and M =(-2, 0)

Answers

I'll try to explain. The trouble is that I do not know English :)
About Points
S = (x,y) searched point (it will be in the third quadrant )
M = (-2,0) Midpoint | SP |
P = (3,5) one end of the segment | SP |

You have to draw Cartesian.

we set in a point M and P. We both points by a simple and we extend it for the third quarter of the system. Compass measure the distance from the point M to the point P. From the point M we set a compass point S. Figure attached. Received point S = ( -7 , -5 ) . It sought a point that calculate .

We use the information that | SM | = | MP |

$x_(S) - x_(M) = x_(M) - x_(P) \n \n x_(S) - (-2) = -2 - 3 \n \n x_(S) +2 = -5 \n \n x_(S) = -5 - 2 = -7$

$y_(S) - y_(M) = y_(M) - y_(P) \n \n y_(S) - 0 = 0 - 5 \n \n y_(S) = -5$

Answer : S = (-7,-5)

as soon as I had a good range will add drawing

Answer:

(-7,-5)

Step-by-step explanation:

Hope it helps.

Y=x+5
y=-2x-4
solve by substitution

Answers

Answer:

x = − 3

Step-by-step explanation:

Let's solve your equation step-by-step.

− 2x − 4 = x + 5

Step 1: Subtract x from both sides.

− 2x − 4 − x = x + 5 − x

− 3x − 4 = 5

Step 2: Add 4 to both sides.

− 3x − 4 + 4 = 5 + 4

−3x = 9

Step 3: Divide both sides by -3.

−3x / −3 = 9 / −3

x = − 3

Hope it helps,

Please mark me as the brainliest

Thank you

Point I is on line segment H
J
‾
HJ
. Given
I
J
=
3
x
+
3
,
IJ=3x+3,
H
I
=
3
x
−
1
,
HI=3x−1, and
H
J
=
3
x
+
8
,
HJ=3x+8, determine the numerical length of
H
J
‾
.
HJ
.