State the vertical, horizontal asymptotes and zeros of the rational function, f(x) = x2+3x+2 x2+5x+4 . why is there no zero at x = –1?

Final answer:

To find the sale price of the shirt after a 15% discount on the marked price of $28, calculate the discount, subtract it from the original price, resulting in a sale price of $23.80.

Explanation:

Marcus bought a shirt that was marked $28, but it was on sale for 15% off the marked price. To calculate the price of the shirt after the discount, you first need to determine the amount of the discount. To do this, convert the percentage to a decimal by dividing by 100 (15% = 0.15) and then multiply this by the original price.

Discount amount = Original price × Discount rate
= $28 × 0.15
= $4.20.

Subtract the discount amount from the original price to find the sale price of the shirt:
Sale Price = Original price - Discount amount
= $28 - $4.20
= $23.80.

Therefore, the price of the shirt after the 15% discount is $23.80.

Answer:

x + 6; where x ≠ -6, +6

Step-by-step explanation:

Part 1)

we have

the scale is [tex]1:100,000[/tex]

the distance on a map is [tex]12\ cm[/tex]

we know that

The scale is equal to the distance on a map divided by the real distance

Let

x------> distance on a map

y-------> real distance

S-------> scale

[tex]S=\frac{x}{y}[/tex]

In this part we have

[tex]S=\frac{1}{100,000}[/tex]

[tex]x=12\ cm[/tex]  

Find the value of y

[tex]y=\frac{x}{S}[/tex]

Substitute the values

[tex]y=\frac{12}{(1/100,000)}[/tex]

[tex]y=1,200,000\ cm[/tex]

Convert to kilometers

[tex]y=12\ Km[/tex]

Part 2)

In this part we have

[tex]S=\frac{1}{300,000}[/tex]

[tex]y=12\ km[/tex]  

Find the value of x

[tex]x=S*y[/tex]

Substitute the values

[tex]x=(1/300,000)*12[/tex]

[tex]x=0.00004 Km[/tex]

Convert to centimeters

[tex]x=4\ cm[/tex]

therefore

the answer is

The distance is [tex]4\ cm[/tex]

Find 81% of 403 by converting the percentage to a decimal (0.81) and then multiplying it by 403, which equals to 326.43 when rounded to the nearest hundredth.

The student is asking for the solution to determine the value of 81% out of 403. This is a simple proportional math problem and could be solved with the following steps:

So, 81% of 403 is approximately 326.43, rounding to the nearest hundredth.

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Area of rectangular field is 6603m². Given width 71m, length is 93m (6603 ÷ 71).

To find the length of the rectangular field, you can use the formula for the area of a rectangle:

[tex]\[ \text{Area} = \text{Length} \times \text{Width} \][/tex]

Given that the area is [tex]\( 6603 \, \text{m}^2 \)[/tex] and the width is [tex]\( 71 \, \text{m} \)[/tex], you can rearrange the formula to solve for the length:

[tex]\[ \text{Length} = \frac{\text{Area}}{\text{Width}} \][/tex]

Substitute the given values:

[tex]\[ \text{Length} = \frac{6603 \, \text{m}^2}{71 \, \text{m}} \][/tex]

[tex]\[ \text{Length} = 93 \, \text{m} \][/tex]

So, the length of the rectangular field is [tex]\( 93 \, \text{m} \).[/tex]

Answer:

y = 1.7

Step-by-step explanation:

Given  : 5x+2y=7  and - 2x+6=9.

To find : Solve the following system of equations. Enter the y-coordinate of the solution. Round your answer to the nearest tenth.

Solution : We have given

5x + 2y = 7 --------(1)

- 2x + 6y = 9 -------(2).

To make the y coefficient same multiply the equation 1 by 3.

15 x + 6y = 21 .

(+)-2x +(-) 6y = (-)9 .

______________ ( On subtracting both the equations )

17 x + 0  = 12 .

17 x = 12 .

On dividing both sides by 17

x = [tex]\frac{12}{17}[/tex].

x = 0.705

Plug x = 0.705 in equation 2 .

- 2 ( 0.705) + 6y = 9.

-1.41 + 6y = 9 .

On adding both sides by 1.41.

6y = 9 + 1.41

6 y = 10. 41

On dividing both sides by 6.

y =  [tex]\frac{10.41}{6}[/tex].

y = 1.735.

Nearest tenth = 1.7

Therefore,  y = 1.7.

Answer:

30 square units

Step-by-step explanation:

For a rectangle to be described as "inscribed" in the context of estimating the area under a curve, the entire rectangle should be positioned underneath the curve.

Therefore, as the curve of f(x) = x² is convex (concave up) in the interval [1, 5], to estimate the area under the curve by using inscribed rectangles, we can use the Left Riemann Sum.

The Left Riemann Sum is a numerical approximation method used to estimate the definite integral of a function over a given interval by dividing the interval into subintervals. It approximates the area under the curve of a function by using rectangles, where the left side of each rectangle touches the curve at the left endpoint of each subinterval.

[tex]\boxed{\begin{minipage}{11cm}\underline{Left Riemann Sum}\\\\$\displaystyle \int^b_a f(x)\; \text{d}x \approx \Delta x \left(f(x_0)+f(x_1)+f(x_2)+...+f(x_{n-2})+f(x_{n-1})\right)$\\\\$\text{where}\; \Delta x=\dfrac{b-a}{n}$\\\end{minipage}}[/tex]

The number of subintervals, n, is the number of rectangles used, and the interval is [a, b].

As the interval is [1, 5], this means that a = 1 and b = 5.

As the number of rectangles to use is 4, then n = 4.

Calculate the value of Δx:

[tex]\Delta x=\dfrac{b-a}{n}=\dfrac{5-1}{4}=\dfrac{4}{4}=1[/tex]

The given partition divides the interval [1, 5] into 4 subintervals where the width of each subinterval is one. Therefore, the left endpoints are:

Substitute everything into the formula and solve:

[tex]\begin{aligned}\displaystyle \int^5_1 x^2\; \text{d}x &\approx 1\cdot \left(f(1)+f(2)+f(3)+f(4))\right)\\\\&=(1)^2+(2)^2+(3)^2+(4)^2\\\\&=1+4+9+16\\\\&=30\end{aligned}[/tex]

Therefore, the estimation of the area under the curve f(x) = x² from x = 1 to x = 5 using four inscribed rectangles is 30 square units.

the equation is, 
a_n = a_(n–1) + 3 * n + 2

Substituting the values for day 4, 

20 + 3*4 + 2 = 34

Thus the equation is correct

Therefore to calculate for a_n at n = 7 or a_7, we must calculate a_5 and a_6 first.

a_5 = 34 + 3*5 + 2 = 51

a_6 = 51 + 3*6 + 2 = 71

Hence,

a_7 = 71 + 3*7 + 2 = 94

Answer: D. 94

Answer:

triangleABC ≅ triangleABD by ASA

Step-by-step explanation:

Took the test and it was correct

multiply the number of games by the number of seats

42362 x 81 = 3,431,322 total seats

Three consecutive integers can be represented as followed.

X → first integer

X + 1 → second integer

X + 2 → third integer

Since the sum of our three consecutive integers is 135, we can set up an equation to represent this.

X + X + 1 + X + 2 = 135

-Simplify on the left-

3x + 3 = 135

      -3     -3

3x = 132

÷3     ÷3       ← divide both sides by 3

X = 44

X + 1 = 45

X + 2 = 46

Therefore, the three consecutive integers are 44, 45, and 46.

Final answer:

Two coins knocked off a table by different forces will hit the ground simultaneously because gravity affects each coin equally, and the horizontal and vertical components of their motion are independent. This is consistent with the universality of free fall and has been empirically demonstrated by repeated experiments.

Explanation:

Do Different Forces Affect Gravity's Impact on Falling Objects?

When two coins are knocked off a table simultaneously with different horizontal forces, their subsequent motion comprises both horizontal and vertical components. However, gravity acts only on the vertical motion, and it does so equally on both coins regardless of their horizontal velocities. According to the laws of physics, specifically Galileo's theory of falling bodies, both coins will hit the floor at the same time because the horizontal and vertical motions are independent of each other. This phenomenon is due to the universality of free fall, which states that all objects accelerate at the same rate under gravity's influence, ignoring air resistance.

An important point to note is that factors such as air resistance can affect the time it takes for objects with different shapes and surface areas to hit the ground. However, in the case of the coins, since they are identical and their shapes do not change as they fall, air resistance does not play a significant role, and thus they hit the ground simultaneously. This was demonstrated by Galileo and can be observed in everyday life, such as by dropping a shoe and a coin side by side.

Answer:

d

Step-by-step explanation:

The absolute value |x−y|>0 when x and y are different, |x−y|=0 when x and y are the same, and |x−y| cannot be < 0 because absolute values cannot be negative.

The question is about absolute value, which refers to the distance of a number from zero on a number line. The notation |x−y| represents the absolute value of (x-y).

When |x−y|>0, it means that x and y are distinct from each other. For example, if x = 2 and y = 1, |x-y| equals |2-1|=1, which is indeed greater than 0. There are infinite such values for x and y as long as they are not the same.

When |x−y|=0, it implies that x and y are the same. The only way the absolute value of a number can be zero is when the number itself is zero. Therefore, this can only happen if x = y. If x and y are both 2, for example, |x-y| equals |2-2|=0.

|x−y| cannot be less than 0. The absolute value of a number can never be negative, because it represents the distance a number is from zero and distance cannot be negative.

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Using the values given for 'a' and the equation '4a + b = 6', we applied the substitution property to prove that the value of 'b' is -14.

Given that a=5 and 4a + b=6, we can use the substitution property to find the value of b. The substitution property allows us to replace a with 5 in the second equation.

Performing the substitution, we have:

By substituting and manipulating the equation, we prove that b equals -14 when a equals 5 and 4a + b equals 6.