There are 6C3 = 20 such combinations.
abc, abd, abe, abf
acd, ace, acf, ade
adf, aef, bcd, bce
bcf, bde, bdf, bef
cde, cdf, cef, def
Are you solving for x or y
y= 24x x= y/24
Answer:
4n-2x-6
Step-by-step explanation:
Let's simplify step-by-step.
4(n−3)−2(−3+x)
Distribute:
=(4)(n)+(4)(−3)+(−2)(−3)+(−2)(x)
=4n+−12+6+−2x
Combine Like Terms:
=4n+−12+6+−2x
=(4n)+(−2x)+(−12+6)
=4n+−2x+−6
Answer:
=4n−2x−6
Answer:
Kindly check explanation
Step-by-step explanation:
Given that:
Initial number of bales of hay = 1041 bales
After stacking more bales in the barn:
Total number of bales after stacking = 2,358 bales
Equation for scenario b
Initial bales + added bales = total number of bales after stacking
Let added bales = b
1,041 + b = 2,357
Added bales = Newly stacked bales:
1041 + b = 2,357
b = 2357 - 1041
b = 1,316
The stacked bales of hay stacked to join the initial is. 1,316 bales
Answer:
(21x+168)cm²
Step-by-step explanation:
If the expression 2 1 (x + 8) represents the area of the model bridge, where 2 1 is the width, in centimeters, and (x + 8) represents the extended length, the expression that is equivalent to 21(x+8) can be gotten by expanding the function. The expansion of the function will give the area of the rectangular model bridge as shown;
21(x+8) = 21x+ 168
The expression equivalent to 21(x+8) is therefore (21x+68)cm²
Note that the the unit of the value and function given is in cm therefore the unit of their equivalent expression will be in cm²
