Clarise is working with a linear function where the two variable quantities increase and decrease in the same direction. Each corresponding output value is the result of only multiplying the input value by the same factor. Is the function increasing or decreasing? Is the function proportional or not proportional? What is the general form of the equation?
rick has $1400 and sally has $1500
step-by-step explanation:
to find amount of money rick has after 10 years :
principal = $1000 , time = 10 years , rate = 4% annually
to find amount of money sally has after 10 years :
her friend gives to pay her $50 per year, therefore money she has after 10 years = 50 × 10 = $500
also, sally gets $1000 after 10 years,
therefore, total amount of money sally has after 10 years = 500 + 1000 = $1500
so, after 10 years : rick has $1400 and sally has $1500
1/6
step-by-step explanation:
tell you what. i'll find the length of the medians and you can fill in the blanks where they belong.
br
b = (2a,0)
r = (a/2,b/2) remember these things are medians. they go to the 1/2 way point of the line opposite the vertex they face.
br^2 = (2a - a/2)^2 + (0 - b/2)^2
br^2 = (3/2 a) ^2 + b^2 / 4
br^2 = 9/4 a^2 + b^2 / 4 we need to find some relationship between a and b.
let's try ab = bc
ab = 2a
bc = (2a - a)^2 + (b - 0)^2
bc = sqrt(a^2 + b^2)
ab = bc
2a = sqrt(a^2 + b^2) square both sides.
4a^2 = a^2 + b^2 subtract a^2 from both sides.
sqrt(3a^2) = sqrt(b^2)
sqrt(3)a = b
let's put b into br^2
br^2 = 9/4 a^2 + 3b^2 / 4
br^2 = 12 a^2 / 4
br^2 = 3a^2
br = sqrt(3) * a
cp
c = (a,b) ; p = (a,0) this is another application of the distance formula, and it is a good one.
cp^2 = (a - a)^2 + (b - 0)^2
cp^2 = 0 + b^2
cp^2 = b^2 which you can see from the diagram.
cp = sqrt(b^2)
cp = b but b = sqrt(3) * a
cp = sqrt(3)*a
aq
a = (0,0)
q = (3/2) a, b/2
aq^2 = (3a/2 -0)^2 + (b/2 - 0)^2
aq^2 = 9a^2/4 + b^2/4
but b = sqrt(3) * a
aq^2 = 9a^2 / 4 + (sqrt(3)*a)^2 /4
aq^2 = 9 a^2/ 4 + 3 a^2 / 4
aq^2 = 12 a^2/4
aq^2 = 3 a^2
aq = (sqrt 3) * a which agrees with the other two.