Prove that if AC=DF and AB=DE then BC=EF
Answers
AC =DF, [ given ]
AB =DE, [ given ]
angle A = angle D
by SAS
ABC congruent to triangle DFE
so
BC = EF, [ CPCTC]
hence proved
Related Questions
Each child ticket for a ride costs $3, while each adult ticket costs $5. The ride collected a total of $150, and 40 tickets were sold. How many of each type of ticket were sold?A. 150 child and 40 adult B. 24 adult and 10 child C. 30 child and 10 adult D. 25 child and 15 adult
How much would $500 invested at 4% interest compounded continuously be worth after 7 years? Round your answer to the nearest cent. A. $640.00B. $648.71C. $657.97D. $661.55
What is the slope and y-intercept of this line?y = –3x + 9A. slope: 3, y-intercept: –9B. slope: –3, y-intercept: 9C. slope: 1, y-intercept: –3D. slope: 9, y-intercept: –3
Calcule: a)(+17)+(-8)+(+19)+(-26)+(+1)=
Answers
Hello from MrBillDoesMath!
Answer:
3,8
Discussion:
Let "n" and "p" be the two positive integers. Then
n = p - 5 (*)
and
np = 24 (**)
Substituting (*) in (**) gives
np = 24 => as p = n+5
n(n+5) = 24 =>
n^2 + 5n - 24 = 0 => factor polynomial (n+8)(n-3)
So n = 3 or -8 but as n is positive, n = 3 Then p = n + 5 = 8
Check:
Is n (3) 5 less than p (8). Yes
Does np = 3 *8 24. Yes
Thank you,
MrB
solve for p.
Answers
Answer: The required solution for p is
Step-by-step explanation: We are given to solve the following equation for the unknown variable p :
To solve the given equation for p, we must find the value of p in terms of D.
From equation (i), we have
Thus, the required solution for p is
11/5p=D+33
p=5/11D+15
Answers
Answer:
To compute the length of the curve f(x)=47(4−x2) over the interval 0≤x≤2, we need to use the formula for the arc length of a function:
L=∫ab1+(f′(x))2dx
where a and b are the endpoints of the interval. First, we need to find the derivative of f(x), which we can do by using the chain rule and the power rule:
f′(x)=4dxd7(4−x2)
f′(x)=427(4−x2)1dxd(7(4−x2))
f′(x)=427(4−x2)1(−14x)
f′(x)=−7(4−x2)28x
Next, we need to plug in f′(x) into the formula and simplify:
L=∫021+(−7(4−x2)28x)2dx
L=∫021+7(4−x2)784x2dx
L=∫027(4−x2)7(4−x2)+784x2dx
L=∫024−x228−21x2dx
Now, we need to evaluate the integral, which we can do by using a trigonometric substitution. Let x=2sinu, then dx=2cosudu and u=arcsin(x/2). The limits of integration change as follows:
x=0⟹u=0
x=2⟹u=2π
The integral becomes:
L=∫02π4−(2sinu)228−21(2sinu)2(2cosu)du
L=∫02π4−4sin2u28−84sin2u(2cosu)du
L=∫02π1−sin2u7−21sin2u(2cosu)du
L=∫02πcos2u7−21sin2u(2cosu)du
L=∫02π27−21sin2udu
Using a trigonometric identity, we can write:
L=∫02π4127−1221cos(2u)du
Using another trigonometric substitution, let v=2u, then dv=2du and u=v/2. The limits of integration change as follows:
u=0⟹v=0
u=2π⟹v=π
The integral becomes:
L=∫0π4127−1221cosv(21)dv
L=6∫0π
A. 23 edges
B. 22 edges
C. 25 edges
D. 20 edges****
Answers
we should have a knowledge of the Euler's Theorem/Euler's Formula
F+V=E+2
Basically states that:
# of Faces+ # of Vertices= # of Edges+2
12 + 10 = E + 2
(-2) + 22 = E + 2 (-2)
20 = E
Yep, The answer is D. 20 edges
Answers
we see that the line intersects the circle in 2 places
2 solutions
A
Answers
Answer:
$42.60
Step-by-step explanation:
change 6.5% to. 065 and multiply it by 40. $2.60 is your sales tax. then add 2.60 to $40 which equals $42.60