the volume of pyramid shown above is 147.97units and the height is is 9.6 units find the length of one edge of the square base

We generally report a measurement by recording all of the certain digits plus​ one uncertain​ digit.

In positional nomenclature, a number's real numbers are its dependable and essential digits for indicating how much of something there is.

If a measurement's result is expressed by a number with more digits than the measurement resolution permits, only those digits up to the measuring resolution's maximum are trustworthy, and only those digits could be significant figures.

Typically, we record all the confirmed digits of measurement together with one questionable digit.

To know more about significant figures:

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The equation 4x - 5 = 4x + 10 has no solution because subtracting 4x from both sides yields -5 = 10, which is a contradiction.

The equation 4x - 5 = 4x + 10 cannot be solved for x in the usual way because attempting to isolate x on one side will result in a contradiction. If we subtract 4x from both sides of the equation, we get -5 = 10, which is not true for any value of x. Therefore, this equation has no solution.

Answer:

[tex]\frac{8}{3}[/tex] is the greatest value.

Step-by-step explanation:

The given numbers are [tex]\frac{8}{3}[/tex], 2.28, [tex]\frac{10}{12}[/tex], 0.199

In this question we have to find out greatest value.

So, first we convert all the values in decimals.

To convert [tex]\frac{8}{3}[/tex] in decimal form, we divide 8 by 3. The answer would be 2.67

2.28

[tex]\frac{10}{12}[/tex] = 0.83

0.199

Now we arrange these numbers in the increasing order.

0.199 < 0.83 < 2.28 < 2.67

So the greatest number is 2.67 that is [tex]\frac{8}{3}[/tex].

hello : 

help :
the discriminat of each quadratic equation : ax²+bx+c=0 ....(a ≠ 0) is :
Δ = b² -4ac
1 )  Δ > 0  the equation has two reals solutions : x =  (-b±√Δ)/2a
2 ) Δ = 0 : one solution : x = -b/2a
3 ) Δ < 0 : no reals solutions

Answer:

Option B, 127.8%

Step-by-step explanation:

If a 24-day single payment loan has a periodic interest rate of 8.4%.

First we divide 365 by 24 to make periods of 24 days in one year.

365 ÷ 24 = 15.21

periodic interest rate of 8.4%

then Annual Percentage Rate = 15.21 × 8.4 = 1 27.76 ≈ 127.8%

127.8% is the approximate APR of the loan.

we have

[tex]f(x)=-2(x+3)^{2}-1[/tex]

we know that

the equation of a vertical parabola in vertex form is equal to

[tex]y=a(x-h)^{2}+k[/tex]

where

[tex](h,k)[/tex] is the vertex

If [tex]a > 0[/tex] ------> then the parabola open upward (vertex is a minimum)

If [tex]a < 0[/tex] ------> then the parabola open downward (vertex is a maximum)

In this problem

the vertex is the point [tex](-3,-1)[/tex]

[tex]a=-2[/tex]

so

[tex]-2 < 0[/tex] ------> then the parabola open downward (vertex is a maximum)

The domain is the interval-------> (-∞,∞)

that means------> all real numbers

The range is the interval--------> (-∞, -1]

[tex]y\leq-1[/tex]

that means

all real numbers less than or equal to [tex]-1[/tex]

therefore

the answer is

a) the vertex is the point [tex](-3,-1)[/tex]

b)  the domain is all real numbers

c) the range is [tex]y\leq-1[/tex]

see the attached figure to better understand the problem

We have a graph of the heart rate vs time.

We want to find on what interval the heart rate increases with a constant rate.

That interval is 3min ≤ t ≤ 4 min

The general function that increases with a constant rate is the general linear function:

y = a*x + b

Where a is the slope and also defines the constant rate of change.

Then the interval where the jogger heart rate changes at a constant rate is the part where we have a linear function (not the horizontal line, there the heart rate does not change).

Then the interval where the heart rate changes with a constant rate is:

3min ≤ t ≤ 4 min

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Using a 99% confidence level and the given data, the confidence interval for Denise's average weekly running mileage can be calculated using the sample mean, standard deviation, and z-score for the confidence level.

Denise, a professional swimmer, uses her running mileage as part of her training analysis. To estimate the population mean for the number of miles she runs weekly, we will calculate the 99% confidence interval using the sample mean and standard deviation from her 20 weeks of data. The formula for a confidence interval is:

CI = mean ± (z* × (s/sqrt(n)))

Where mean is the sample mean, z* is the z-score corresponding to the desired confidence level, s is the sample standard deviation, and n is the sample size.

The given data for Denise's running mileage is a mean (μ) of 17.5 miles and standard deviation (s) of 3.8 miles with a sample size (n) of 20 weeks. Since the sample size is greater than 30, we can use the z-distribution to approximate the t-distribution.

To find the appropriate z-score for a 99% confidence interval, we can use a graphing calculator or a z-table. The z-score for a 99% confidence level is approximately 2.576. Plugging the values into the confidence interval formula:

CI = 17.5 ± (2.576 × (3.8/sqrt(20)))

Calculating the margins of error and applying them to the sample mean, we will obtain the confidence interval for the average number of miles Denise runs in a week.

a) total cost = 499 + 49.99x

b) x = 5 games

 total cost = 499 + 49.99(5) = 499 + 249.95 = 748.95

It’s a little surprising that this question didn’t come up earlier.  Unfortunately, there’s no intuitive way to understand why “the energy of the rest mass of an object is equal to the rest mass times the speed of light squared” (E=MC2).  A complete derivation/proof includes a fair chunk of math (in the second half of this post), a decent understanding of relativity, and (most important) experimental verification.

Answer:

2 would represent the rate at which the animals were increasing

Step-by-step explanation: This all comes back to the slope intercept form:

y = mx + b

2x is the slope, and the slope is the rate of which a point will increase or decrease.

5+8 = 13 total marbles

5 are green

 so you would have a 5/13 probability of picking a green one

Completing the square with fractions involves transforming the quadratic equation into a perfect square trinomial by adding the square of half the coefficient of x to both sides. This enables solving the equation more easily by then taking the square root of both sides and isolating x.

Completing the square using fractions involves a few steps tailored to work with fractional coefficients. To make it understandable, let's explain the process step by step:

For example, let's complete the square for the equation x2 + (3/2)x = 4. We take half of the coefficient of x, (3/2)/2 or 3/4, and square it to get 9/16. Adding 9/16 to both sides gives us (x + 3/4)2 = 4 + 9/16. Simplify the right side to get a single fraction, and then proceed to solve for x. Additionally, in some scenarios, we might need to multiply both the numerator and denominator by a skillfully chosen factor, such as 1/2, to facilitate simplifying or cancelling out terms.

Answer:

A

Step-by-step explanation:

Jacobysontop!

Answer:

A. Line k bisects PQ

B. PR is congruent to QR

C. Line k intersects PQ at a 90 angle

Step-by-step explanation:

A perpendicular bisector of a line is a segment that cuts right in the middle a line, and that segment forms a 90º degree angle with the line. This means that the point where the segment cuts the line would be exactly the half, making both resultant segments on the line congruent. So the options that are correct are ABC.

it means both sections are equal.

 so BD = 18 and DC = 18

Answer:

The answer is the option C

[tex]V=38.37\ ft/sec[/tex]

Step-by-step explanation:

we have that

[tex]V=\sqrt{64h}[/tex]

In this problem we have

[tex]h=23\ ft[/tex]

Substitute in the formula and solve for V

[tex]V=\sqrt{64(23)}[/tex]

[tex]V=\sqrt{1,472}\ ft/sec[/tex]

[tex]V=38.37\ ft/sec[/tex]

Answer:

If two angles are equal in measure then each of the two angles has a measure of 28 degrees.

Step-by-step explanation:

The converse of a statement is found by switching the hypothesis and conclusion of a conditional statement.

The hypothesis is the part that comes after "if" and the conclusion is the part that comes after "then."

This means the hypothesis is "each of two angles has a measure of 28 degrees" and the conclusion is "the two angles are equal in measure."

This gives us the converse "If two angles are equal in measure then each of the two angles has a measure of 28 degrees."

Answer:

The complex number 4-i has distance  [tex]\sqrt{17}[/tex] from origin.

D is correct

Step-by-step explanation:

We are given the absolute value of complex plane.

If complex number is a+ib then absolute value [tex]\sqrt{a^2+b^2}[/tex]

We have to check the absolute value of each option and check which is equal to [tex]\sqrt{17}[/tex]

Option A:  2+15i

[tex]d=\sqrt{2^2+15^2}=\sqrt{4+225}=\sqrt{229}\neq \sqrt{17}[/tex]

Option B:  17+i

[tex]d=\sqrt{17^2+1^2}=\sqrt{289+1}=\sqrt{290}\neq \sqrt{17}[/tex]

Option C:  20-3i

[tex]d=\sqrt{20^2+3^2}=\sqrt{400+9}=\sqrt{409}\neq \sqrt{17}[/tex]

Option D:  4-i

[tex]d=\sqrt{4^2+1^2}=\sqrt{16+1}=\sqrt{17}= \sqrt{17}[/tex]

Hence, The complex number 4-i has distance  [tex]\sqrt{17}[/tex] from origin.