If you are looking for the answer of m when t=6 and a=20, you’ve got the right page. We have approximately 10 FAQ regarding m when t=6 and a=20. Read it below.
Solve each . 1) y is directly proportional to x
Ask:
Solve each .
1) y is directly proportional to x . If y = 20 when x = 4 , find m when n = -3 .
2) g is proportional to the square of t . If t = 2 and g = 64 , find t when = 32 .
3) a varies directly as the square root of b. If a = -6 when b = 9 , find b when a = -4 .
Goodluck!
Answer:
1. m= -15
2. t = √2
3. a = 4
Step-by-step explanation:
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Solve the following: If M varies directly as a and
Ask: Solve the following: If M varies directly as a and inversely as the square t, and M = 4 when a = 16 and t = 3 find: a. M when t = 6 and a = 20 b. a when t = 4 and M = 7 c. t when M = 1 and a = 36 -
Answer:
a. M= 45
b. A= 49 7/9
c. T= 9
Step-by-step explanation:
Pa brainliest po. Thank you
5. Given that m varies directly as p, and m
Ask: 5. Given that m varies directly as p, and m = 35 when p = 5. Find the constant of variation.
a. 5
c. 7
d. 8
b. 6
6. Ifm varies directly as p and m = 35 when p = 5, find m when p is 6.
a. 42
b. 36
c. 30
d. 48
7. Write an equation where x varies inversely as y when r = 30 when y = 3.
10
a. x = 10y
b. x = 10/y
c. x = 90y
d. x =90/y
8. If x varies inversely as y and x = 30 when p = 3, find x when y is 9.
a. 90
b. 10
c. 10/9
d. 810
9. Solve for the constant of variation given that / varies jointly as q2 and h, and f = 24 when q = 2 and h = 2, find f
a. 6
b. 3
d. 4
c. 12
10. Suppose p varies directly as r and inversely as 1, t = 20 when p = 4 and r = 2. Find t when r = 10 and p=-5.
a. -80
b.-20
c. 80
d. 4
5.D
6.A
7.B
8.C
9 D
10.A
Sana’y Makatulong pa brainlist po!
1. 2. What is the formula to get the value
Ask: 1. 2. What is the formula to get the value of the constant in the joint variation?
Akze
C.k.
<
ab
cm=2
3r
B. k=
D. k=-
2. The equation of the equation of the relation if m varies jointly as p and r if m= 18 when p = 6
and r= 2.
A. m pr
Bm=pr
Dm=
3. 6. the speed s inversely proportional to the time t”
A s=k/t
C. s=kt
B. s=kit
D. stk
4. 7. If A varies inversely as B and A is twice as B and the value of B = 10, find A when B = 20
Α. Ο
C. 20
B. 10
D 200
5. 10. y varies directly as x if y = 2,5 when x = 0.25, find y when x = 0.75.
A 3.5
C 6.5
B 5.5
D. 7.5
Answer:
1.b
2.a
3.d
4.c
5.a
not sureeeeeeeeeeeeeee
Answer:
1.c
2.d
3.b
4.a
5.a
Step-by-step explanation:
sana naka tulong
follow please
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#CarryOnLearning
ACTIVITY 2Direction: Solve the following. 1. If y varies jointly
Ask: ACTIVITY 2
Direction: Solve the following.
1. If y varies jointly as x and z,if y = 3 when x = 4, and z = 8, what is value of y if x = 8 and z = 12?
2.If c varies jointly as r and t,if c =15 when r =10 and t=20,find c when r=20 and t=30.
3.If y varies jointly as q and p,if q=1.5 when q=3.5 and p=5,find q when y=10 and p=15.
4.If m varies jointly as n and h,and m=5 3/5 when n=3 2/5 and h=2 3/5,find m when n=6 3/5 and h= 10 3/5.
5.z varies jointly as x and y,z=60 when x=3 and y=4,find y when z=80 zand x=2.
Thank you po in advance…
Answer:
you need to learn if you will permanent ask to app how about people say wrong read this
all step to answer thath
Step-by-step explanation:
step1.Write the correct equation. Joint variation problems are solved using the equation y = kxz. When dealing with word problems, you should consider using variables other than x, y, and z, you should use variables that are relevant to the problem being solved. Also read the problem carefully to determine if there are any other changes in the joint variation equation, such as squares, cubes, or square roots.
Step 2: Use the information given in the problem to find the value of k, called the constant of variation or the constant of proportionality.
Step 3: Rewrite the equation from step 1 substituting in the value of k found in step 2.
Step 4: Use the equation found in step 3 and the remaining information given in the problem to answer the question asked. When solving word problems, remember to include units in your final answer.
a. M when t = 6 and a = 20
Ask: a. M when t = 6 and a = 20
b. a when to 4 and M = 7
c. t when M-1 and a = 36​
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A. M when t = 6 and a = 20
Solve the followingM varies directly as a and inversely as
Ask: Solve the following
M varies directly as a and inversely as the square 1, and M 4 when a = 16 and
-3 find:
a. Mwhen 6 and a = 20
b. a when t4 and M = 7
c. t when M – 1 and 36
Answer:
pakilinaw po or drop the pic nalang
Solve the following.If M varies directly as a and inversely
Ask: Solve the following.
If M varies directly as a and inversely as the square t, and M = 4 when a = 16 and t = 3 find:
a. M when t=6 and a = 20
b. a when t = 4 and M = 7
c. t when M = 1 and a = 36
Answer:
A. M= 5/4
B. A= 448/9
C. T = 9
Step-by-step explanation:
THE EQUATION IS M= ak/t^2
So K= 9/4
A. 5 over 4
engenswer the following question and put the letter on the
Ask: enge
nswer the following question and put the letter on the box that correspond to your
nswer to reveal the secret code.
M p varies directly as the cube of q, and p = 26 when q=2,
nd p when 9-5.
If p varies directly as the square of q, and p = 20 when q = 5, find p when q = 8.
11 m varles directly as n.If m=6 when n=2,find m when n=.3.
If g is proportional to the square of t. If t=2 and g=64, find g when t=3.5.
If y varies directly as x, and y=24 when x=6, find the value of y when x=15.
Ify is directly proportional to x. If y=15 when x=4, find y when x=5.
196
60
75 1625
60
256
4
4
5
Give us an activity that is
MENTARD
no
M p varies directly as the cube of q, and p = 26 when q=2,
nd p when 9-5.
If p varies directly as the square of q, and p = 20 when q = 5, find p when q = 8.
11 m varles directly as n.If m=6 when n=2,find m when n=.3.
If g is proportional to the square of t. If t=2 and g=64, find g when t=3.5.
If y varies directly as x, and y=24 when x=6, find the value of y when x=15.
Ify is directly proportional to x. If y=15 when x=4, find y when x=5.
196
60
75 1625
60
256
4
4
5
Give us an activity that is
MENTARD
no
Answer:60
r varies directly as s and inversely as t. If
Ask: r varies directly as s and inversely as t. If r = 5 when s = 20 and t = 4.
2. If a varies jointly as b and c, then a = 12 when b = 8, C = 2
3. M varies directly as n and inversely as the square of p, if m = 2 when n = 6 and p =3.
[ paki answer nalang ty 🙂 ]
Answer:
1.) k=1
2.) k=3/4
3.) k=3
Step-by-step explanation:
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Not only you can get the answer of m when t=6 and a=20, you could also find the answers of engenswer the following, Solve the followingM, ACTIVITY 2Direction: Solve, 1. 2. What, and a. M when.
