Answer:
b. User-fierce interfaces
Explanation:
Based on the scenario being described it seems this is an example of User-fierce interfaces. This basically means that the system in question is not very user friendly, which ultimately makes it very difficult for users to understand, use, and manipulate. This tends to cause the users to get frustrated and ultimately stop using the system as they believe it is too difficult and not worth their time. This is what seems to be happening with the customized learning management system in this question since the 20% of the users quit instantly due to the difficulty of the system.
Answer:
Option E i.e., Select the functions of the system you wish to use is the correct answer.
Explanation:
In the above statement, some part of the question is missing that is options.
The first step is taken by the user is that they have been select those methods of the computer system which he wants to use firstly if he has to implement the software or an application for that manufacturers who sales the appliances of the kitchen. Then, it is necessary to take the following steps by the user according to its needs.
Answer:
Let P(x) = x is in the correct place
Let Q(x) = x is in the excellent place
R(x) denotes the tool
Explanation:
a) Something is not in the correct place.
P(x) is that x is in the correct place so negation of ¬P(x) will represent x is not in the correct place. ∃x is an existential quantifier used to represent "for some" and depicts something in the given statement. This statement can be translated into logical expression as follows:
∃x¬P(x)
b) All tools are in the correct place and are in excellent condition.
R(x) represents the tool, P(x) represents x is in correct place and Q(x) shows x is in excellent place. ∀ is used to show that "all" tools and ∧ is used here because tools are in correct place AND are in excellent condition so it depicts both P(x) and Q(x). This statement can be translated into logical expression as follows:
∀ x ( R(x) → (P(x) ∧ Q(x))
c) Everything is in the correct place and in excellent condition.
Here P(x) represents correct place and Q(x) represents excellent condition ∀ represent all and here everything. ∧ means that both the P(x) and Q(x) exist. This statement can be translated into logical expression as follows:
∀ x (P(x) ∧ Q(x)
if you search up how windows is better that mac this comes up
"99% of these users will prefer a PC to a Mac because it's the right platform for their needs. Final Cut Pro users use Macs. It doesn't run on Windows.... ... Extreme enthusiasts prefer PCs because they can run better hardware in a PC than they can get in a Mac."
all you have to do is put it in your own words :)
