a. R = I ÷ E
b. R = EI
c. R = IE
d. R = E ÷ I
B.(1,3)
C.(4,6)
D.(3,6)
E.(4,2)
F.(5,10
The following points that are on the line given by the equation y=2x are Options (D). (3,6) and (F). (5,10).
A straight line is a line passing through the x-y plane that has equal intercepts with respect to the x axis and the y-axis. The slope of a straight line is always equal. The straight line is also satisfied by the coordinates points in the x and y axis respectively.
To identify the points satisfied by any given equation, we have to replace the points given in the following equation.
Taking first point in option (A) , (16,8) , we have y = 8 and x = 16 which does not satisfy the equation y = 2x .
Taking second point in option (B) , (1,3) , we have y = 3 and x = 1 which does not satisfy the equation y = 2x .
Now from the following options, checking points in Option (D) where x = 3 and y = 6 which satisfies the equation y = 2x .
Also checking the points in Option (F) where x = 5 and y = 10 which satisfies the equation y = 2x .
The following points that are on the line given by the equation y=2x are Option(D). (3,6) and Option(F). (5,10) .
To learn more about points in a straight line, refer -
#SPJ2
Answer: it’s (5,10) and (3,6)
A. (4x -5)^2
B. (16x - 25)(16x + 25)
C. (4x + 5)(4x + 5)
D. (4x - 5)(4x + 5)
Answer: D. (4x - 5)(4x + 5)
Volume=4/81π ft^3
Answer:
(∛3)/2 ft = r
Step-by-step explanation:
Start with the formula for the volume of a sphere: V = (4/3)πr³. Solve this for r³ and then take the cube root of the result:
3V
V = (4/3)πr³ => (3/4)V = πr³ => (------- = r³
4π
3 · 4/81π ft^3 3 · 4π ft³ 3 ft³
Here we have r³ = -------------------- = ---------------- = -------------
4π 8(4π) 8
and so the radius is r = ∛[ (3/8) ft³] = (∛3)/2 ft = r
Part A: What is the solution to the pair of equations represented by p(x) and f(x)? (3 points)
Part B: Write any two solutions for f(x). (3 points)
Part C: What is the solution to the equation p(x) = g(x)? Justify your answer. (4 points)