The entire graph of the equation y=x^2+k...

The entire graph of the equation `y=x^2+k x-x+9` in strictly above the `x-a xi s` if and only if `k<7` (b) `-5-5` (d) none of these

Text Solution

Verified by Experts

The correct Answer is:

`-5 lt k lt 7`

`y=x^(2)+(k-1)x+9=(x+(k-1)/(2))^(2)+9-((k-1)/(2))^(2)`
For entire graph to be above x-axis, we should have
`9-((k-1)/(2))^(2) gt 0`
`implies k^(2)-2k-35 lt 0`
`implies (k-7)(k+5) lt 0`
`implies -5 lt k lt 7`

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If the graph of the function 16x^2+8(a+5)x-7a-5=0 is strictly above the X-exis, then

`2ltalt15`

`-15ltalt-2`

`17ltalt30`

`agt0`

If the graph of the function y=16x^(2)+8(a+5) x-7a-5 is strictly above the x-axis, then 'a' must satisfy the inequality

`-15 lt a lt -2`

`-2 lt a lt -1`

`5 lt a lt 7`

none of these

If the equation x^(2)+2(k+2)x+9k=0 has equal roots then k= ?

1 or 4

`-1" or "4`

1 or -4

`-1" or "-4`