if x=3t-6, determine the value of x by substituting the value of t given

To determine the value of x by substituting the given values of t, we substitute t = -1, t = 2, t = 5, and t = 12 into the equation x = 3t - 6.

For t = -1:
x = 3(-1) - 6
x = -3 - 6
x = -9

For t = 2:
x = 3(2) - 6
x = 6 - 6
x = 0

For t = 5:
x = 3(5) - 6
x = 15 - 6
x = 9

For t = 12:
x = 3(12) - 6
x = 36 - 6
x = 30

Therefore, the values of x when substituting the given values of t are:

t | x
---------------
-1 | -9
2 | 0
5 | 9
12 | 30

by substituting the value of t given
t|1|2|5|12
x| | | |

To determine the value of x by substituting the given values of t, we substitute t = 1, t = 2, t = 5, and t = 12 into the equation x = 3t - 6.

For t = 1:
x = 3(1) - 6
x = 3 - 6
x = -3

For t = 2:
x = 3(2) - 6
x = 6 - 6
x = 0

For t = 5:
x = 3(5) - 6
x = 15 - 6
x = 9

For t = 12:
x = 3(12) - 6
x = 36 - 6
x = 30

Therefore, the values of x when substituting the given values of t are:

t | x
---------------
1 | -3
2 | 0
5 | 9
12 | 30

calculate the c=value of l by substituting the given value of the pronumeral into the formular l=2(d+2)-3
a. d=3
b. d=0
c. d=7
d. d=31

To calculate the value of l by substituting the given values of d into the formula l = 2(d+2) - 3, we substitute d = 3, d = 0, d = 7, and d = 31.

a. For d = 3:
l = 2(3+2) - 3
l = 2(5) - 3
l = 10 - 3
l = 7

b. For d = 0:
l = 2(0+2) - 3
l = 2(2) - 3
l = 4 - 3
l = 1

c. For d = 7:
l = 2(7+2) - 3
l = 2(9) - 3
l = 18 - 3
l = 15

d. For d = 31:
l = 2(31+2) - 3
l = 2(33) - 3
l = 66 - 3
l = 63

Therefore, the values of l when substituting the given values of d are:

d | l
---------------
3 | 7
0 | 1
7 | 15
31 | 63