Answer:
2,210,000 different schedules
Step-by-step explanation:
Cory needs to have an equal number of piano sonatas from J. S. Bach, Haydn, and Wagner.
Since he is setting up a schedule of 9 piano sonatas to be played, he needs:
- 3 out of 5 J. S. Bach piano sonatas
- 3 out of 52 Haydn piano sonatas
- 3 out of 5 Wagner piano sonatas
We then calculate how many different schedules are possible using combination.
Number of possible Schedules
There are 2,210,000 different possible schedules.
60 6×10^1
Move the non- zero to the right creating the exponent.
This translates to "a number" is greater than 45. All you have to do now is translate these words into an algebraic statement. Basically, you replace "a number" with the variable which it is defined for, and you use the "greater than" symbol to show that the variable is greater than the value of 45.
The answer is 8+2x
This is because product means<span> the result of multiplying, or an expression that identifies factors to be multiplied. So 8 plus the product of 2 and the variable x this expression is written like this 8+2x.</span>