Maths-
General
Easy
Question
![x plus y equals 5](data:image/png;base64,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)
![2 x equals 5](data:image/png;base64,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)
If (x, y) is the solution to the given system of equations, what is the value of y ?
The correct answer is: 2.5
The given set of equations are linear equations in 2 variables (i.e. highest power of the variable is 1).
We'll solve the given simultaneous equations to find the solution.
Step-by-step solution:-
x + y = 5 ------------- (equation i)
2x = 5
∴ x =
------------ (equation ii)
Substituting equation ii in equation i,
x + y = 5
![5 over 2 plus y equals 5](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAEcAAAAjCAYAAADG1RdTAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAXQ/cXWQAAAXtJREFUeNrtmb1KA0EUhQdJEcRGJFgKwUIknVgEexGLIIKIiPgKIb1Y2Vj4AmJhYSMiFiG9iIidiIUIeQULCxER1jNwikkyWRij6/6cAx8kU4Tl28mde3eN8SeKofCRBMmRHMlJWs4neAMd0AIT0tKbElgAe+AZzEmJP8vgWhqG50MK/KmBrjQYcwnqYIysUMy61BizAV7AF3gF52AxhyeyRqQs9HKR5Ix+MSdg07PeBAdFl7MLDvvWxlkDpwJrR1wNyaScVR4AbvbZpf/biBT9kFF+zxe7O56c7xW2EeU8j0gh2/jd+XzEevPbNyFVI1LIRd6AKumyEc31iBQi5xQ0wBnYKcKIFCKnySP9USPSYNYos5HGEWkJXPCYs8fdA9hOUI6VcpfWO2cr9pZz7s+DW64lkQ63fGYy88c1wC2K7SxOsnoSOCR1/rWUvtjW/Z6FWnEyCa7YWitOqhQzKxW9sdPpMZ+lKE6m2TGWpGIwbaNXv7FDYuFfW3wDLH+OrJrsLn8AAACKdEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1mcmFjPjxtbj41PC9tbj48bW4+MjwvbW4+PC9tZnJhYz48bW8+KzwvbW8+PG1pPnk8L21pPjxtbz49PC9tbz48bW4+NTwvbW4+PC9tYXRoPusSh6cAAAAASUVORK5CYII=)
![therefore y equals 5 minus 5 over 2](data:image/png;base64,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)
![therefore y equals fraction numerator 10 minus 5 over denominator 2 end fraction](data:image/png;base64,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)
![therefore y equals 5 over 2](data:image/png;base64,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)
Final Answer:-
∴ Value of y for the given linear equations is
= 2.5
Related Questions to study
Maths-
The table gives some values of x and the corresponding values of f(x) for polynomial function f. Which of the following could be the graph of f in the xy - plane, where y = f(x)?
x | f(x) |
-2 | -2 |
-1 | 3 |
0 | 2 |
1 | 7 |
2 | 30 |
The table gives some values of x and the corresponding values of f(x) for polynomial function f. Which of the following could be the graph of f in the xy - plane, where y = f(x)?
x | f(x) |
-2 | -2 |
-1 | 3 |
0 | 2 |
1 | 7 |
2 | 30 |
Maths-General
Maths-
The graph of
, where m and b are constants, is shown in the xy - plane. What is the value of m ?
The graph of
, where m and b are constants, is shown in the xy - plane. What is the value of m ?
Maths-General
Maths-
The half-life of a certain substance in an aquatic environment is about 150 years. Which of the following exponential functions best models the amount
, in grams, of the substance
years after 200 grams of the substance is applied to the aquatic environment? (The half-life is the length of time needed for an amount of the substance to decrease to one-half of that amount.)
The half-life of a certain substance in an aquatic environment is about 150 years. Which of the following exponential functions best models the amount
, in grams, of the substance
years after 200 grams of the substance is applied to the aquatic environment? (The half-life is the length of time needed for an amount of the substance to decrease to one-half of that amount.)
Maths-General
Maths-
![L minus S square root of 1 minus fraction numerator v to the power of 2 end exponent over denominator c to the power of 2 end exponent end fraction end root](data:image/png;base64,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)
When the speed of an object approaches the speed of light, its length as seen by an observer changes. When the object is stationary relative to an observer, its length is
, and when the same object is moving at speed
relative to the observer, its length is
. The formula above expresses
in terms of
, and
, the speed of light. Which of the following gives the speed of the object in terms of the other quantities?
![L minus S square root of 1 minus fraction numerator v to the power of 2 end exponent over denominator c to the power of 2 end exponent end fraction end root](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAGkAAAAzCAYAAACUlyarAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAfTSyfawAAA4tJREFUeNrtXG9klVEYf1wzyTWN0VJxJdmHK6PSUlTsw8z9MCmaiq6RpA/7EBXNilK2D1FEkklSrWysrA+pqSQz2vpDf6Q+ZKL0T6n0//d4n6vb9dreu3vve895zvvjx7t733nPOb+dc57fc569RPbjjwO0GrXgG4pgNFaAd6JhMBsbwbPRMJiNveBBS/fQ7+BtcL52kXrArZa2PQZuA+9qF2kIbLK8D9+0i/TS8uViJXhDs0DTZG2vsLT9s2RPmqdZpDrwhaVtXwBeFqFUIyV7ko0zaBCsciH83g6eMKxNa8AzPp9fA5vlelBWASfQDe4yrE0cxIz5BAfDPj5JTW5uIvSD6w1s1xfxQBlw2qrR1WzDKLjYwHaxKAvlukl7iD0ZOLJLGNiuU+A6uealb5mrArE3+mGoR+JUTxfYAl51eRYlJNtgIjiK6wMfgvUui9RosEeaTl4+biDM6KSUS9Y+cFw6NUzBk6Wc+e4J4Oo7fELiMPABTJYyzr8fUkcGZN3mPwjOw6XB3oC/y2dIeya55zS4RaMP4UEL46RzdYHPuZCHR1InUie4M4TnbCAvVTJVjIANrorUK7Op1Jgrex8/byqZYK4QqnFVpKfg7JCeVS+z6bNs8EGDlRngpzyeo0qkmAxYPp0vRlFfq8wqPgCLBxR3tMgiFdKXUIshl5bRe8QlGusIGNz0uzqTWgN4j1JiE3gy57NVPvftAA+7KtIR8SrlAs+kVNbPtTLAM3PuO0regZ+TIvVROOVRx8Dd9O90skpC/4s5912SAU77fJ5yVaR3E2xklUV8TlJmDaeCuIqTz1/acu7h8uEr4GvyMsrZeETBjp9NPQFVU8HaDs6RTtzM+e4reWkkDdG0igrW4+DznH3qlTJvan0Fa1o8VAacChpRJJCKCtYa+r9KdS15yVUNUFXB+ou8fxbLeKRuBX1SV8HKydT9WR6pXcEMUlfBek+8UcYjtVjQ5rhYh3EJtdmDVst3KitYz4FP5PoBmV/cEZew+oDMlkpZplOG+7eCwF7io1y/p+DnSOXCIfJSbE6hQYKHhAUeKSZ7aLVrInH4/RvcTOa/DmAJeIscBRva82T+6wAyhZFO4hn4lsx/HcAi8LGrIl2XKMiG1wGMSWRXIdEd+7rlLojUJSLZ8DoAroTifNxP8gpN21yZSc0iUpIiGItMojUeDYXZGIqGwHy0R0NgPupc7fhfMtYlJ7Lz2SUAAADRdEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1pPkw8L21pPjxtbz4tPC9tbz48bWk+UzwvbWk+PG1zcXJ0Pjxtbj4xPC9tbj48bW8+LTwvbW8+PG1mcmFjPjxtc3VwPjxtaT52PC9taT48bW4+MjwvbW4+PC9tc3VwPjxtc3VwPjxtaT5jPC9taT48bW4+MjwvbW4+PC9tc3VwPjwvbWZyYWM+PC9tc3FydD48L21hdGg+7ttfkgAAAABJRU5ErkJggg==)
When the speed of an object approaches the speed of light, its length as seen by an observer changes. When the object is stationary relative to an observer, its length is
, and when the same object is moving at speed
relative to the observer, its length is
. The formula above expresses
in terms of
, and
, the speed of light. Which of the following gives the speed of the object in terms of the other quantities?
Maths-General
Maths-
![x to the power of 2 end exponent minus 14 x plus 40 equals 2 x plus 1](data:image/png;base64,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)
What is the sum of the solutions to the given equation?
![x to the power of 2 end exponent minus 14 x plus 40 equals 2 x plus 1](data:image/png;base64,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)
What is the sum of the solutions to the given equation?
Maths-General
Maths-
What is the
-intercept of the graph of
in the
-plane?
What is the
-intercept of the graph of
in the
-plane?
Maths-General
Maths-
What is the area, in square units, of the figure shown?
![](data:image/png;base64,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)
What is the area, in square units, of the figure shown?
![](data:image/png;base64,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)
Maths-General
Maths-
![fraction numerator 4 x plus b over denominator 2 end fraction equals 2 x plus 8](data:image/png;base64,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)
In the given equation,
is a constant. If the equation has infinitely many solutions, what is the value of
?
![fraction numerator 4 x plus b over denominator 2 end fraction equals 2 x plus 8](data:image/png;base64,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)
In the given equation,
is a constant. If the equation has infinitely many solutions, what is the value of
?
Maths-General
Maths-
Which of the following is an equation of the line in the
-plane that contains the points
and ![left parenthesis 5 , 15 right parenthesis ?](data:image/png;base64,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)
Which of the following is an equation of the line in the
-plane that contains the points
and ![left parenthesis 5 , 15 right parenthesis ?](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAADQAAAARCAYAAACSGY9uAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAOJ5y/mQAAAWtJREFUeNpjYEAFWUDcwTC4QAfUXSQDPSA+zjA4wVGo+0jWZIDE/48HEwvUgLgWiC/gkCfWDmMgPozE94PyfwDxJyCeDcTiyBoMoB5Ct4xSsBiI0/CYRYodh6EeA4FNQGwJxExQvgeahxm6gDiHBh4iZBYpduQRyN8/kDk7gNh2kHsIFCN78citQRYApUO2Qe4hNqg70YEtNGnzIAv+wWHZL6gh24C4CF0TlTxEih2/0PigvL8QKS/h9RAMsEAzI6i0ugHEGlT0EKl2/MJSUAhiU4gtyWEDbkB8kAYeIsYObEkOZ0TsBmJrIi38QWMP4bIDX6GAAbAV29iADhDfpbGHcNmRA3UnUQBbxboOqfJiglZeIIuC0NQthzo4gAwPEWsHesVKVEAdR2svhQLxLWg6fQfEq4DYFIs+fB4i1KQh1g70pg9RHqKkcQrylNdga5yCQAYZ3QdQcr0CLXppAbqg7UG6AWn0lu5AAgBKGHejHhNFnwAAAGp0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bW8+KDwvbW8+PG1uPjUsMTU8L21uPjxtbz4pPC9tbz48bW8+PzwvbW8+PC9tYXRoPlkqN9YAAAAASUVORK5CYII=)
Maths-General
Maths-
![fraction numerator x plus 2 over denominator left parenthesis x plus 2 right parenthesis to the power of 2 end exponent end fraction](data:image/png;base64,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)
Which of the following expressions is equivalent to the given expression, where
?
![fraction numerator x plus 2 over denominator left parenthesis x plus 2 right parenthesis to the power of 2 end exponent end fraction](data:image/png;base64,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)
Which of the following expressions is equivalent to the given expression, where
?
Maths-General
Maths-
Which of the following is equivalent to the given expression?
Which of the following is equivalent to the given expression?
Maths-General
Maths-
Bill is planning to drive 1,000 miles to visit his family. If he plans to drive 250 miles per day, which of the following represents the remaining distance
, in miles, that Bill will have to drive to reach his family after driving for
days?
Bill is planning to drive 1,000 miles to visit his family. If he plans to drive 250 miles per day, which of the following represents the remaining distance
, in miles, that Bill will have to drive to reach his family after driving for
days?
Maths-General
Maths-
Aracely can spend up to a total of
on streamers and balloons for a party. Streamers cost
per pack, and balloons cost
per pack. Which of the following inequalities represents this situation, where
is the number of packs of streamers Aracely can buy, and
is the number of pack of balloons Aracely can buy? (Assume there is no sales tax.)
Aracely can spend up to a total of
on streamers and balloons for a party. Streamers cost
per pack, and balloons cost
per pack. Which of the following inequalities represents this situation, where
is the number of packs of streamers Aracely can buy, and
is the number of pack of balloons Aracely can buy? (Assume there is no sales tax.)
Maths-General
Maths-
The function
is defined by
. What is the value of f(4) ?
The function
is defined by
. What is the value of f(4) ?
Maths-General
Maths-
In the figure shown, line j is parallel to line
and line
is parallel to line
. What is the value of x ?
![](data:image/png;base64,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)
In the figure shown, line j is parallel to line
and line
is parallel to line
. What is the value of x ?
![](data:image/png;base64,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)
Maths-General