NEED HELP!Every evening Jenna empties her pockets
and puts her change in a jar. At the end
of the week she counts her money. One
week she had 50 coins, all of them dimes
and quarters. When she added them up,
she had a total of $10.25.
Let d = number of dimes and
q = number of quarters.
Answers
10d + 25q = 1025
Multiply the first equation by 10.
10(d + q = 50) --> 10d + 10q = 500
We combine this with the second equation
10d + 25q = 1025
10d + 10q = 500
--------subtract--------
15q = 525 iff
q = 35
Plug in q = 35 into any of the original equations,
d + q = 50
d + 35 = 50 iff
d = 15
There are 15 dimes, and 35 quarters.
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Solve for x: 1 over 4 (2x − 14) = 4.
Which is equivalent to (−2m + 5n)2, and what type of special product is it4m2 + 25n2; a perfect square trinomial 4m2 + 25n2; the difference of squares 4m2 − 20mn + 25n2; a perfect square trinomial 4m2 − 20mn + 25n2; the difference of squares
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a2=6
a3=-18
the common ratio musbe negative since the signs alternate
it is multiilied by 3 ach time
comon ratio is -3
an=-2(-3)^(n-1)
Answer:
the common ratio is -3
Step-by-step explanation:
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35.5% means 35.5/100 so,
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W = 40
Answer:
W=40
Step-by-step explanation:
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Answer:
s = vt + 16t^2
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Answer:
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2x+4y=30
Elimination using multiplication
Answers
2
sin
x
at the point (π/6,1)
π
6
1
.
The equation of this tangent line can be written in the form y=mx+b
y
m
x
b
where
Answers
Final answer:
To find the equation of the tangent line to the curve y=2sinx at the point (π/6,1), we take the derivative to find the slope and then use the point-slope form of the line equation. The result is y = √3x + 1 - √3π/6.
Explanation:
The subject of this question is calculus and focuses specifically on finding the equation of the tangent line to the curve y=2sinx at a given point. To do this, we use the formula y=mx+b.
Firstly, the slope of the tangent line is obtained by taking the derivative of the function at the point of tangency. The derivative of y=2sinx is y'=2cosx. For the given point (π/6,1), the slope (m) would be 2cos(π/6) = √3.
Secondly, we use the point-slope form of the line equation to find b. Inserting the values of the slope (m) and the given point into the equation, we get 1 = √3(π/6) + b. Solving for b gives b = 1 - √3π/6.
Finally, the equation of the tangent line is y = √3x + 1 - √3π/6.
Learn more about Tangent Line here:
#SPJ2
f(x) = 2sin(x)
f(π/6) = 1
f'(x) 2cos(x)
f'(π/6) = 2×co(π/6) = 2 × root(3)×0.5 =root(3)
The equation of this tangent line is : y= root(3)(x-π/6)+1
y = root(3)x+1 - π/6(root(x)) in the form y=mx+b
m = root(3) and b = 1 - π/6(root(x))