Shawn purchased $87.06 worth of merchandise at a department store. He gave the clerk $100. Round to the nearest whole dollar to

Answer:

Option D) 7.90 g and 8.12 g

Step-by-step explanation:

The details provided in the question are:

Mean, μ = 8.01 g

Standard Deviation, σ = 0.06 g

The weights are distributed in a bell-shaped normal distribution.

Formula:

We need to determine the value of x for which the probability is 0.03.

P(X > x)  

Using the standard normal z table, we find that,

Thus, the value of 8.17 g separates the upper 3% of the weights.

P(X < x)  

From the standard normal z table, we derive,

Consequently, 7.90 separates the lower 3% of the weights.

Option D) 7.90 g and 8.12 g

Solution:

[(2x² + 5x) + (4x² – 4x)] + 5x³ =

(2x² + 5x) + [(4x² – 4x) + 5x³]

Step-by-step breakdown:

Both A and B.

This is due to the fact that X=3 cleanly divides the rectangle into two equal halves, causing any reflection to resemble the original shape.

Additionally, any shape with two lines of symmetry, when rotated 180 degrees, will align with one of the axes of symmetry and appear the same as the original shape.

Answer:

4

Step-by-step explanation:

Each sandwich costs 6 dollars, while chips sell for 3 dollars. She purchased 5 sandwiches at 6 dollars each, amounting to 30 dollars (5*6=30). This leaves her with 12 dollars to use since her total expenditure was 42 dollars. Given that chips are 3 dollars each, with 12 dollars left, 4 bags could be bought (4 * 3 = 12).

Response:

The equation provided is e=\frac{17}{20}d, where e represents euros and d denotes the equivalent value in U.S. Dollars.

We aim to determine the number of euros for 1 U.S. Dollar.

Substituting d=1 in the above equation

results in

e=\frac{17}{20}(1)

Simplifying gives us

e=\frac{17}{20}

By dividing 17 by 20, we get 0.85.

Thus, 0.85 euros are equivalent to 1 U.S. Dollar.

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Step-by-step explanation: