If you want me to pick the correct answer out of a list of multiple choices for you,
then the least you could do is let me see the list.
iipi9pi0[
0.3 x = 84
79 + k = 84 84 - 79 = k k = 5
Any of the Following: 84*1=84 42*2=84 28*3=84 21*4=84 14*6=84
The answer is; 54.6 But I used my TI-84 to get that answer and I can not remember how to do these.
(3/24x)/84=(1/8x)/84=1/672x
iipi9pi0[
In order to solve for x, there must be an x in the equation.If you meant to say 3x/14=84, then 3x=14(84), so x=392 If you meant to say 3/14x=84, then 84x=3/14, so x=0.00255102041 If you meant to say 3/14=84x, then the above line is the answer.
-84
3/14=x/8414x=252 x=18
0.3 x = 84
79 + k = 84 84 - 79 = k k = 5
mram ti 84 sequences
Any of the Following: 84*1=84 42*2=84 28*3=84 21*4=84 14*6=84
The answer is; 54.6 But I used my TI-84 to get that answer and I can not remember how to do these.
21 and 84
Let the number be 'm' & 'n' mn = -84 m + n = 25 Algebraically rearrgange m = -84/n m = 25 - n Substitute for 'm' -84/n = 25 - n Multiply through by 'n' -84 = 25n - n^2 n^2 - 25n - 84 = 0 It is now in Quadratic Form . You can either try and factor or apply the Quadratic Eq'n. n = { - - 25 +/- sqrt[(-25)^2 - 4(1)(-84)]} / 2(1) n = { 25 +/- sqrt[ 625 + 336]} / 2 n = { 25 +/- sqrt[961]} / 2 n = {25 +/- 31}/2 n = 56/2 or -6/2 n = 28 or -3 Hence m = -3 or 28