A student evaluates the expressions and at several different values of . The student claims, "The value of the expression is always greater than the value of the expression ."
Which value of can be used to show that the student's claim is false?
A.
2
B.
4
C.
6
D.
8
for one answered was right and here is the proof
Option (A). 2 is the correct option that will claim the student statement "The value of the expression 3x+3 is always greater than the value of the expression 2x+6." as false.
Expression:
Expression means the sentence with a minimum of two numbers or variables and at least one math operation. This math operation can be addition, subtraction, multiplication, or division.
Given,
A student evaluates the expressions 3x+3 and 2x+6 at several different values of .
The student claims, "The value of the expression 3x+3 is always greater than the value of the expression 2x+6."
Here we need to find value of x can be used to show that the student's claim is false.
For that, we have to verify each value in order to find the correct one,
Then,
Let option (A) x = 2
=> 3(2) + 3 = 2(2) + 6
=> 6 + 3 = 4 + 6
=> 9 < 10
Now we have to apply the other option (B),
Let x = 4, then
=> 3(4) + 3 = 2(4) + 6
=> 12 + 3 = 8 + 6
=> 15 > 14
Now we have to apply the other option (C),
Let x = 6, then
=> 3(6) + 3 = 2(6) + 6
=> 18 + 3 = 12 + 6
=> 21 > 18
Now we have to apply the other option (D),
Let x = 6, then
=> 3(8) + 3 = 2(8) + 6
=> 24 + 3 = 16 + 6
=> 27 > 22
So, the correct option is (A) x = 2.
A. 2
The answer isnt 2
then wat is it genius?
read my name
To evaluate the expressions and determine which one is greater, we need to substitute each value of into the expressions and compare the results.
Let's evaluate the expressions for each value of :
For , the expression is:
Expression =
For , the expression is:
Expression =
For , the expression is:
Expression =
For , the expression is:
Expression =
Comparing the results, we find:
For , the value of Expression is:
For , the value of Expression is:
For , the value of Expression is:
For , the value of Expression is:
From the comparisons, we can see that when , the value of Expression is greater than the value of Expression .
Therefore, the answer is
Option D. 8