All categories

2 years ago

If a jogger runs 2 miles and burns 185 calories, how many calories would he burn

Mathematics

2 answers:

Goryan [66]2 years ago

3 0

Answer:

277.5

Step-by-step explanation:

Divide 185 by 2, and you get 92.5. Add that to 185 and you get 277.5

LenaWriter [7]2 years ago

3 0

Answer:

277.5

Step-by-step explanation:

so if u know 2 miles is 185 then u divide 185/2=92.5 so now u take 185(cause its 2 miles) + 92.5=277.5 if i am wrong sorry but this is the way i would solve it

You might be interested in

DO NOT ANSWER WITH BITLY LINKS! Find the measure of the arc or central angle indicated. Assume that lines that appear to be diam

Svetach [21]

Answer:

135°

Step-by-step explanation:

LI = LM+MI = 35+80

5 0

2 years ago

What is the measure of f in the figure shown?

SCORPION-xisa [38]

Answer:

The measure of angle f is 61°

Step-by-step explanation:

A straight line is 180° meaning;

180 - 98 = 82

82 is the angle measure of the unlabeled angle.

All triangles angles add up to 180° meaning;

37 + 82 = 119

180 - 119 = 61°

5 0

2 years ago

The perimeter of a rectangular baking sheet is 58 inches and its area is 201.25 in.2. What are the length and width of the bakin

anzhelika [568]

Answer:

$Length=17.5\ in\\\\Width=11.5\ in$

Step-by-step explanation:

The formula for calculate the Area of a rectangle is:

$A=lw$

Where "l" is the lenght and "w" is the width.

And the formula for calculate the peimeter of a rectangle is:

$P=2l+2w$

Where "l" is the lenght and "w" is the width.

We know that the perimeter of the rectangular baking sheet is 58 inches and its area is 201.25 in². Then:

$A=201.25\ in^2\\\\P=58\ in$

<u>The steps are:</u>

1. Solve for the "l" from the formula $A=lw$ :

$A=lw\\\\l=\frac{A}{w}\\\\\l=\frac{201.25}{w}$

2. Substitute $l=\frac{201.25}{w}$ into the formula $P=2l+2w$ and solve for "w":

$58=2(\frac{201.25}{w})+2w\\\\58=\frac{402.5}{w}+2w\\\\58=\frac{402.5+2w^2}{w}\\\\58w=402.5+2w^2\\\\2w^2-58w+402.5=0$

Applying the Quadratic formula $x=\frac{-b\±\sqrt{b^2-4ac}}{2a}$ , we get:

$x=w=\frac{-(-58)\±\sqrt{(-58)^2-4(2)(402.5)}}{2(2)}\\\\w_1=17.5\\\\w_2=11.5$

3. Substitute $w_1=17.5$ into $l=\frac{201.25}{w}$ :

$l=\frac{201.25}{17.5}=11.5$

4. Substitute $w_2=11.5$ into $l=\frac{201.25}{w}$ :

$l=\frac{201.25}{11.5}=17.5$

Therefore, since the value of the lenght of a rectangle must be greater that the value of the width, we can conclude that the lenght and the width of the rectangular baking sheet are:

$l=17.5\ in\\\\w=11.5\ in$

8 0

3 years ago

If orange cost 12.50 pesos each how much do three dozen oranges cost

GalinKa [24]

Answer:

i guess the answer is 450.

3 0

2 years ago

PLEASE HELP!! DUE SOON!!

ryzh [129]

Answer:

Do you still need help??

Step-by-step explanation:

5 0

3 years ago