Using Factors to Write Equivalent Expressions

Mathematics

2 answers:

IrinaVladis [17]3 years ago

6 0

Answer:

(x + 1)(x + 8)

Step-by-step explanation:

I graphed the equation on the graph below to find the x values.

snow_tiger [21]3 years ago

5 0

Your answer is the first option, (x + 1)(x + 8)

We can find this by expanding the brackets and seeing if the resultant expression is x² + 9x + 8. We can expand it using the FOIL method (first, outside, inside, last)

(x + 1)(x + 8)

x × x = x² (first)
x × 8 = 8x (outside)
1 × x = x (inside)
1 × 8 = 8 (last)

Adding these all together gives us x² + 8x + x + 8 = x² + 9x + 8, which is the original expression.

I hope this helps!

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In aâ€‹ lottery, 6 numbers are randomly sampled without replacement from the integers 1 to 50. Their order of selection is not i

nlexa [21]

Answer: 0.444225

Step-by-step explanation:

Given : The total number of tickets = 50

Number of tickets are randomly sampled without replacement =6

Since the order of selection is not important , so we use combinations.

Total number of ways to select 6 tickets = $^{50}C_6$

The number of winning tickets = 6

So, number of tickets that are not winning = 50-6=44

Number of ways of selecting zero winning numbers= $^{44}C_{6}$

Now , the probability of holding a ticket that has zero winning numbers out of the 6 numbers selected for the winning ticket out of the 50 possible numbers would be $\dfrac{^{44}C_{6}}{^{50}C_6}$

$=\dfrac{\dfrac{44!}{6!(44-6)!}}{\dfrac{50!}{6!(50-6)!}}\\\\\\=\dfrac{\dfrac{44\times43\times42\times41\times40\times39\times38!}{38!}}{\dfrac{50\times49\times48\times47\times46\times45\times44!}{44!}}\\\\\\=\dfrac{44\times43\times42\times41\times40\times39}{50\times49\times48\times47\times46\times45}\\\\=\dfrac{252109}{567525}\approx0.444225$