What is the value of x in x/7 = 35

Answers

Answer 1

Answer:
Try multiplying each side of the equation by 7 .
Then you must quickly step to one side, as the
answer jumps off the page at you.

Answer 2

Answer: x / 7 = 35

Multiply both sides by 7 :

7*( x / 7 ) = 7 *35

Refine:

x = 245

hope this helps!.

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Gretchen and Mika are involved in a relay race. Both runners are at the same point on the course when Gretchen realizes that she dropped her baton and has to turn around to retrieve it. Gretchen runs backwards at a speed of −4 m/s, relative to the direction of the race. Mika continues running at a speed of 3 m/s. If Gretchen dropped her baton −48 meters from her current location, relative to the direction of the race, how far ahead will Mika be when Gretchen picks her baton up?________ meters

Answers

Solution: Mika will be 36 meters away from the current location.

Explanation:

It is given that Gretchen and Mika are at the same point when Gretchen runs backward at the speed of 4 m/s in opposite direction to pick her baton and Mika runs in the direction of the race at the speed of 3 m/s.

We have find the distance covered by Mika form the current location in the time when Gretchen picks her baton up.

Let the time taken by Gretchen picks her baton up be t.

It is given that 48 meters from her current location she dropped her baton. Since she is running at the speed of 4 m/s.

$t=(48)/(4) =12$

Gretchen will pick up the baton in 12 seconds.

The distance covered by Mika in 12 seconds is $3* 12=36$

Therefore, Mika will be 36 meters away from the current location.

The baton is dropped -48m from the current position, and Gretchen runs backwards at a speed of -4m/s, so it will take her -48m/(-4m/s) or 12 seconds before she picks up her baton.

During these 12 seconds, Mika will have traveled 3m/s*12s=36m.

How much is 30% of 300 dollars?

Answers

It would be $90
(.30)(300)=90

30/100×300=30×3=90I am sure this helps

4/7t = 4

t=

please & thank you xx <3

Answers

To solve for t, you must multiply both sides by $(7)/(4)$ to isolate it.

t=(4)*( $(7)/(4)$ ) The 4s cancel leaving 7.

t=7

Can someone help me with this problem...
#20

Answers

3/12, 1/3, 2/5, 4/9, 5/8, 2/3, 3/4, 5/6

I need help please and thank you

Answers

Answer:

the perimeter is 40 ft

Step-by-step explanation:

to find the perimeter you add up all the sides

WILL MARK BRAINLYIEST!!!! Ellie drew ΔLMN, in which m∠LMN = 90°. She then drew ΔPQR, which was a dilation of ΔLMN by a scale factor of one half from the center of dilation at point M. Which of these can be used to prove ΔLMN ~ ΔPQR by the AA similarity postulate?

Answers

Final answer:

The triangles ΔLMN and ΔPQR are similar as per the AA similarity postulate. This is because ΔLMN and ΔPQR have two pairs of congruent corresponding angles: ∠LMN and ∠PQR, and ∠LM and ∠PQ, contemporaneously proving the AA (Angle-Angle) similarity postulate.

Explanation:

The given problem involves two triangles ΔLMN and ΔPQR. Here, ΔLMN is the original triangle, and ΔPQR is a dilated version of ΔLMN by a scale factor of one-half centered at point M.

For the AA (Angle-Angle) similarity postulate, we need to confirm that two angles of one triangle are congruent to two angles of another triangle. If we can establish this, we can deduce that the two triangles are similar.

Firstly, it is given that m∠LMN is 90°. As a property of dilation, it preserves the measures of angles. This means that m∠PQR will also be 90°. Secondly, since the dilation happens at point M, ∠M of ΔLMN will be the same as ∠P of ΔPQR. Thus, we have two sets of corresponding angles (LMN and PQR, and LM and PQ) that are congruent, satisfying the AA similarity postulate. Therefore, we can conclude that ΔLMN is similar to ΔPQR by the AA similarity postulate.

Learn more about Triangle Similarity here:

brainly.com/question/34830045

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Final answer:

The triangles ΔLMN and ΔPQR can be proven similar by the AA similarity postulate.

Explanation:

The triangles ΔLMN and ΔPQR are similar to each other by the AA (Angle-Angle) similarity postulate.

AA similarity postulate states that if two angles of one triangle are congruent to two angles of another triangle, then the triangles are similar.

In this case, since ΔPQR is a dilation of ΔLMN with a scale factor of one half, the angles of ΔPQR are congruent to the corresponding angles of ΔLMN.

Therefore, we can conclude that ΔLMN ~ ΔPQR by the AA similarity postulate.

Learn more about Similarity of triangles here:

brainly.com/question/14926756

#SPJ2

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