3.148085752161e17
-should be right,did my best
Answer:
b-Nested Loops
Explanation:
To create a 1-D array we use single loop.For example:-
int a[10];
for(int i=0;i<10;i++)
{
cin>>a[i];
}
Taking input of a 1-D array.
For creating a 2-D array we use nested loops.
int a[row][column];
for(int i=0;i<row;i++)
{
for(int j=0;j<column;j++)
{
cin>>a[i][j];
}
}
Hence the answer for this question is nested loops.
Answer:
speed = int(input("Enter the speed: "))
hour = int(input("Enter the hour: "))
for i in range(1, hour + 1):
distance = speed * i
print("The distance traveled after " + str(i) + " hour(s): " + str(distance))
Explanation:
Ask the user for the speed and hour as input
Initialize a for loop that iterates from 1 to the given hours
Calculate the distance after each hour, multiply speed by hour
Print the distance after each hour
The most likely problem that led to the signal strength is lower than expected is a D. Wrong antenna type
<h3>What is a Computer Network?</h3>
This refers to the inter-connectivity between wireless bridges to connect a computer system to the world wide web.
Hence, we can see that based on the fact that there is troubleshooting going on about two wireless bridges where the signal strength is lower than expected, the most likely problem that led to the signal strength is lower than expected is a D. Wrong antenna type
Read more about computer networks here:
brainly.com/question/1167985
#SPJ1
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)
