Which problems will have two decimal places in the product? Mark all that apply.Group of answer choices
3 × 0.65
4.8 × 2
8.1 × 10
6.1 × 7.3
7.22 × 100
Answers
Answer:
48. x 2
Step-by-step explanation:
4.8 x 2
Related Questions
If the density of an object is 8 g/cm cubed, and the mass is 200g. what is the volume of the object
A vat of milk has spilled on a tile floor. The milk flow can be expressed with the function r(t) = 4t, where t represents time in minutes and r represents how far the milk is spreading.The spilled milk is creating a circular pattern on the tile. The area of the pattern can be expressed as A(r) = πr2. Part A: Find the area of the circle of spilled milk as a function of time, or A[r(t)]. Show your work. (6 points) Part B: How large is the area of spilled milk after 4 minutes? You may use 3.14 to approximate π in this problem. (4 points)
Mr ramirez bought 1/4 pounds of cashews he divided the cashews equally with 3 childern. how many cashews did each children get
C is more than half of n
Answers
Final answer:
The subject of this question is Mathematics. The inequality n + 7 ≤ 9 can be solved by subtracting 7 from both sides. The solution is n ≤ 2.
Explanation:
The subject of this question is Mathematics. The question involves solving an inequality involving a number, n, that is added to 7 and is less than or equal to 9. To find the possible values of n, we can subtract 7 from both sides of the inequality:
n + 7 ≤ 9
n ≤ 9 - 7
n ≤ 2
So, the values of n that satisfy the inequality are any number less than or equal to 2.
Learn more about Solving Inequalities here:
#SPJ12
56=1/2(x)(x+6)
56=1/2(x2+6)
56=x(x+6)
56=x2+6
Save
Question 2 (1 point) Question 2 Unsaved
The height of a triangle is 5 m less than its base. The area of the
triangle is 42 m2. Find the length of the base.
Question 2 options:
12 m
11 m
8 m
7 m
Save
Question 3 (1 point) Question 3 Unsaved
Which equation would best help solve the following problem?
Tyler has a rectangular garden that measures 10 m wide by 13 m long. He wants to increase the area to 208 m2 by increasing the width and length by the same amount. What will be the dimensions of the new garden?
Question 3 options:
208=(10)(13)
208=(10+x)(13+x)
208=(10+13)(x)
208=(10+x2)(13)
Save
Question 4 (1 point) Question 4 Unsaved
Adina has a rectangular garden that measures 9 m wide by 13 m long. She wants to increase the area to 192 m2 by increasing the width and length by the same amount. What will be the width (shorter dimension) of the new garden?
Question 4 options:
14 m wide
13 m wide
12 m wide
11 m wide
Save
Question 5 (1 point) Question 5 Unsaved
Holly has a rectangular garden that measures 12 m wide by 14 m long. She wants to increase the area to 255 m2 by increasing the width and length by the same amount. What will be the length (longer dimension) of the new garden?
Question 5 options:
16 m
17 m
18 m
19 m
Save
Answers
The equation use to find the length of the base of a triangle is
Answer for Question #2.
The length of the base of a triangle is 12 m.
Answer for Question #3.
The equation use to find the dimensions of the new garden is
208 = (10 + x)(13 + x).
Answer for Question #4.
The width of the new garden is 12 m.
Answer for Question #5.
The length of the new garden is 17 m.
Answer:
16
Step-by-step explanation:
A disk with a radius of cm costs US dollars(USD).
(a) Find an equation which links and . [3]
(b) Find, to the nearest USD, the cost of the disk that has a radius of
cm.
Answers
Answer:
(a) To find an equation that links the cost of the disk and its radius, we can use the given information that the cost is directly proportional to the cube of the radius. Let's denote the cost of the disk as C and the radius as r.
According to the given information, we can write:
C ∝ r^3
Since we are looking for an equation, we need to introduce a constant of proportionality. Let's call this constant k. Therefore, we can rewrite the equation as:
C = k * r^3
Now, we need to find the value of k. We are given that a disk with a radius of cm costs USD . Substituting these values into our equation, we get:
= k * (^3)
Simplifying further:
= k *
Now, we can solve for k by dividing both sides of the equation by :
k =
Therefore, our equation linking the cost of the disk (C) and its radius (r) is:
C = * r^3
(b) To find the cost of a disk with a radius of cm, we can substitute this value into our equation from part (a). Let's denote this cost as C1 and the radius as r1.
C1 = * (r1)^3
Substituting r1 = cm into the equation:
C1 = * (^3)
Calculating this expression will give us the cost of the disk to the nearest USD.
The answer to part (b) cannot be provided in this format as it requires specific numerical values for and r1. Please provide those values so that I can calculate and provide you with an accurate answer.
Step-by-step explanation:
Answers
Answer:
A trust can protect your assets for the next generation. However, if you have debt, the trust will not necessarily protect assets from creditors. If you or your beneficiaries file for bankruptcy, for example, the trust could be seized for repayment of debts.
Answers
Answer:
D none of the above. I hope it is correct
Answers
Answer:
what they promote? describe each.