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2 years ago

The absolute value of 5.8 is _________.

Mathematics

2 answers:

Natali5045456 [20]2 years ago

7 0

Answer:

5.8

Step-by-step explanation:

Schach [20]2 years ago

5 0

5.8! Because the absolute value is the distance from 0

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What is the first term in this expansion? a 2x15 b 215x15 c 10y15 d 1015y15

Oduvanchick [21]

Answer:

2^15x^15 is the correct answer.

Step-by-step explanation:

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3 years ago

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Jessica reads aloud from science website. She comes across the mesurement 0.32 meter. How shouls she read this mesurement aloud?

andreev551 [17]

Answer:

zero point three two meter

Step-by-step explanation:

Given

$Measurement = 0.32\ meter$

Required

How should it be pronounced

From the measurement above, we can see that it contains a decimal point.

Using the rules of decimal point,

The number before the decimal point will be treated as 1 number and will be pronounced as such.

While numbers after the decimal will be treated as individual digits and will be pronounced individually.

Hence, the pronunciation of 0.32 meter is zero point three two meter

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3 years ago

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Use the diagram to solve for segments SW and WQ. Show your work and/or explain how you determined the answer

Minchanka [31]

The intersecting chords theorem states that whenever two chords intersect, the product of their pieces is constant.

So, in this case, we have

$\overline{RW}\cdot\overline{WP}=\overline{SW}\cdot\overline{WQ}$

Plugging your values, we have

$8\cdot 9 = 6x \cdot 12x \iff 72=72x^2 \iff x^2=1$

This equation has solutions $x=\pm 1$ , but we can't choose $x=-1$ , because it would lead to

$\overline{SW}=-6,\quad\overline{WQ}=-12$

So, the only feasible solutions is $x=1$

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3 years ago

The ends of the base of an isoceles triangle are

Vanyuwa [196]

Are at (2,0) & (0,1) & the eqn of one side is x=2, then the orthocentre of the triangle is a) (3/2, 3/2) ...

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3 years ago

Suppose that the division N/5 leaves a remainder of 4, and the division N/2 leaves a remainder of 1, what is the ones digit on N

Tju [1.3M]

Since N/2 leaves a remainder, N must be odd and ends with 1, 3, 5, 7, or 9.

N/5 also leaves a remainder, so N is not divisible by 5, so it does not end in 5.

The only correct choice is then 9, since

1 = 0•5 + 1 and 1 = 0•2 + 1

3 = 0•5 + 3 and 3 = 1•2 + 1

7 = 1•5 + 2 and 7 = 3•2 + 1

9 = 1•5 + 4 and 9 = 4•2 + 1

Alternatively, the given information is equivalent to saying

$N\equiv 4\pmod5\\\\N\equiv1\pmod2$

Then you can use the Chinese remainder theorem to find N.

7 0

3 years ago