it would be something like this:
f(x) = 12 + x(4%)
but if you want it in y format then:
y = 12 + x(4%)
Answer:
-1 ft³/s
Step-by-step explanation:
∫₂₀¹⁰⁰ B"(t) dt = B'(t) |₂₀¹⁰⁰
∫₂₀¹⁰⁰ B"(t) dt = B'(100) − B'(20)
∫₂₀¹⁰⁰ B"(t) dt = 2 ft³/s − 3 ft³/s
∫₂₀¹⁰⁰ B"(t) dt = -1 ft³/s
Answer:
<h2>
sin2P ≈ 1</h2>
Step-by-step explanation:
Given SinP + SinQ = 7/5...1 and
∠P + ∠Q = 90°... 2
From compound angle; SinP +SinQ = ... 3
Substituting equation 2 into 3 we will have;
SinP +SinQ = = 7/5
since P = 90-Q from equation 1, then;
To get sin2P; Accoding to the trig identity;
Sin2P = 2SinPCosP
Sin2P = 2Sin53.15cos53.15
sin2P = 0.9598
sin2P ≈ 1
<span>1,331x^3 − 216 = 0
</span>1,331x^3 = 216
cube root both sides
11x = 6
x = 6/11
Let's calculate the mean of the 5 lunches in the first week. We calculate the mean by adding all the numbers up and dividing by how many numbers there are. So we have:
So this is the mean of the 5 lunches in the first week. We are told that in the second week he spent $3 more on his 5 lunches, let's calculate the mean of the second week:
This is the mean for the second week. Subtract it from the mean in the first week to find the increase: