{(-2,6),(1,8),(3,4),(-3,8),(c,d)}
The given set of coordinates can be represented as:
{(-2,6),(1,8),(3,4),(-3,8),(c,d)}
In this set, the x-coordinates are -2, 1, 3, -3, and c.
The corresponding y-coordinates are 6, 8, 4, 8, and d.
The set can be rewritten as: {(-2,6),(1,8),(3,4),(-3,8),(c,d)}
what is c and d
Without any specific information or equations given to determine the values of c and d, it is not possible to determine their exact values. C and d could represent any real numbers. Therefore, the values of c and d can be any real number and cannot be determined from the given set of coordinates.
For which ordered pair left-parenthesis c comma d right-parenthesis is the relation a function?
(-2,8)
(1,-8)
(3,4)
(-3,5)
In order to determine if the relation is a function, each x-coordinate must be associated with only one y-coordinate.
Let's check each ordered pair:
(-2, 8): This pair is fine because -2 is associated with only one value of 8.
(1, -8): This pair is also fine because 1 is associated with only one value of -8.
(3, 4): This pair is valid as 3 is associated with only one value of 4.
(-3, 5): This pair is also valid as -3 is associated with only one value of 5.
Therefore, the relation is a function for all four ordered pairs: (-2,8), (1,-8), (3,4), (-3,5).
i tried (-3,5) its not the answer
Apologies for the confusion. Let's reevaluate the given ordered pairs:
(-2, 8): This pair is fine because -2 is associated with only one value of 8.
(1, -8): This pair is also fine because 1 is associated with only one value of -8.
(3, 4): This pair is valid as 3 is associated with only one value of 4.
(-3, 5): This pair is not valid because -3 is associated with two different values, 8 and 5. Hence, this pair violates the definition of a function.
So, the relation is a function for the ordered pairs: (-2, 8), (1, -8), and (3, 4).
The following table shows a relation.
x y
0 8
1 6
4 3
2 5
4 6
Which two elements in the domain are paired with the same element in the range?
1 and 4
2 and 4
4 and 3
5 and 6
To determine which two elements in the domain are paired with the same element in the range, we need to examine the given table:
x y
0 8
1 6
4 3
2 5
4 6
Looking at the range (the y values), we can see that 4 is paired with both 3 and 6. So, the answer is:
4 and 4
The following table shows a relation.
x y
0 8
1 6
4 3
2 5
4 6
Which two elements in the domain are paired with the same element in the range?
a)1 and 4
b)2 and 4
c)4 and 3
d)5 and 6
To determine which two elements in the domain are paired with the same element in the range, we need to examine the given table:
x y
0 8
1 6
4 3
2 5
4 6
Looking at the range (the y values), we can see that 4 is paired with both 3 and 6. So, the answer is:
c) 4 and 3
thats wrong
Apologies for the mistake. Let's reevaluate the given table:
x y
0 8
1 6
4 3
2 5
4 6
Looking at the range (the y values), we can see that 6 is paired with both 4 and 6.
So, the correct answer is:
d) 5 and 6
thats also wrong only one chance left
Apologies for the incorrect responses. Let's reevaluate the given table again:
x y
0 8
1 6
4 3
2 5
4 6
Looking at the range (the y values), we can see that 4 is paired with both 3 and 6.
So, the correct answer is:
a) 1 and 4
are you sure?
Apologies for the incorrect responses earlier. Let's reevaluate the given table again:
x y
0 8
1 6
4 3
2 5
4 6
Looking at the range (the y values), we can see that 6 is paired with both 4 and 6.
So, the correct answer is:
d) 5 and 6
If f left-parenthesis x right-parenthesis equals 2 superscript x baseline minus 10 and the domain of f left-parenthesis x right-parenthesis is the set of integers from negative 1 to 3, which values are elements of the range of f left-parenthesis x right-parenthesis? Select all that apply.
a)-12
b)-10
c)-9
d)-6
e)-2
To find the range of f(x) = 2^x - 10 for the given domain of x being integers from -1 to 3, we can evaluate the function for each value in the domain.
For x = -1:
f(-1) = 2^(-1) - 10 = 1/2 - 10 = -9.5
For x = 0:
f(0) = 2^0 - 10 = 1 - 10 = -9
For x = 1:
f(1) = 2^1 - 10 = 2 - 10 = -8
For x = 2:
f(2) = 2^2 - 10 = 4 - 10 = -6
For x = 3:
f(3) = 2^3 - 10 = 8 - 10 = -2
Based on the above evaluations, the values that are elements of the range are:
c) -9
d) -6
e) -2
So, the correct options are c), d), and e).