Answer:
$31,000
Explanation:
Calculation to determine Elaine's current basis in her partnership interest
Using this formula
Elaine's current basis= Value of original basis + (interest purchased - Cash received) + Tax exempt interest
Let plug in the formula
Elaine's current basis= $40,000 + ($70,000 - $80,000) + $1,000
Elaine's current basis= $40,000 - $10,000 + $1,000
Elaine's current basis= $31,000
Therefore Elaine's current basis in her partnership interest is $31,000
Answer:
a)
Explanation:
Phishing is a type of deception in which an intruder disguises himself in email or other means of communication as a reputable individual or person. Attackers would normally use phishing e-mails to spread a range of malicious links or attachments. Some people will gather login credentials or victims' account details.
So as per above definition only option A seems the correct alternative among al the other option when discussing about Phishing.
A con executed using technology, typically targeted at acquiring sensitive information, or tricking someone into installing malicious software.
Answer:
$786,100
Explanation:
Funk Company
Accounts receivable $93,500 -$ 89,600
=$3,900
Sales totaled $790,000 - $3,900
=$786,100
Hence;
Cash (received from customers)$786,100
Add Accounts receivable $3,900
Sales revenue $790,000
Therefore the amount of cash received from customers during 2021 will be $786,100
Answer:
A) R(x) = 120x - 0.5x^2
B) P(x) = - 0.75x^2 + 120x - 2500
C) 80
D) 2300
E) 80
Explanation:
Given the following :
Price of suit 'x' :
p = 120 - 0.5x
Cost of producing 'x' suits :
C(x)=2500 + 0.25 x^2
A) calculate total revenue 'R(x)'
Total Revenue = price × total quantity sold, If total quantity sold = 'x'
R(x) = (120 - 0.5x) * x
R(x) = 120x - 0.5x^2
B) Total profit, 'p(x)'
Profit = Total revenue - Cost of production
P(x) = R(x) - C(x)
P(x) = (120x - 0.5x^2) - (2500 + 0.25x^2)
P(x) = 120x - 0.5x^2 - 2500 - 0.25x^2
P(x) = - 0.5x^2 - 0.25x^2 + 120x - 2500
P(x) = - 0.75x^2 + 120x - 2500
C) To maximize profit
Find the marginal profit 'p' (x)'
First derivative of p(x)
d/dx (p(x)) = - 2(0.75)x + 120
P'(x) = - 1.5x + 120
-1.5x + 120 = 0
-1.5x = - 120
x = 120 / 1.5
x = 80
D) maximum profit
P(x) = - 0.75x^2 + 120x - 2500
P(80) = - 0.75(80)^2 + 120(80) - 2500
= -0.75(6400) + 9600 - 2500
= -4800 + 9600 - 2500
= 2300
E) price per suit in other to maximize profit
P = 120 - 0.5x
P = 120 - 0.5(80)
P = 120 - 40
P = $80